1641 lines
55 KiB
Scheme
1641 lines
55 KiB
Scheme
;;; SRFI-1 list-processing library -*- Scheme -*-
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;;; Reference implementation
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;;;
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;;; Copyright (c) 1998, 1999 by Olin Shivers. You may do as you please with
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;;; this code as long as you do not remove this copyright notice or
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;;; hold me liable for its use. Please send bug reports to shivers@ai.mit.edu.
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;;; -Olin
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; Changes made for Scheme 48
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;
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; - CHECK-ARG is defined as a macro that does nothing.
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; - replaced the one use of LET-OPTIONAL
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; - added definition of :OPTIONAL
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(define-syntax check-arg
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(syntax-rules ()
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((check-arg stuff ...) #f)))
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(define (:optional maybe-value default)
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(cond ((null? maybe-value)
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default)
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((null? (cdr maybe-value))
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(car maybe-value))
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(else
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(error "too many arguments passed to :optional" maybe-value))))
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;;; This is a library of list- and pair-processing functions. I wrote it after
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;;; carefully considering the functions provided by the libraries found in
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;;; R4RS/R5RS Scheme, MIT Scheme, Gambit, RScheme, MzScheme, slib, Common
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;;; Lisp, Bigloo, guile, T, APL and the SML standard basis. It is a pretty
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;;; rich toolkit, providing a superset of the functionality found in any of
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;;; the various Schemes I considered.
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;;; This implementation is intended as a portable reference implementation
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;;; for SRFI-1. See the porting notes below for more information.
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;;; Exported:
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;;; xcons tree-copy make-list list-tabulate cons* list-copy
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;;; proper-list? circular-list? dotted-list? not-pair? null-list? list=
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;;; circular-list length+
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;;; iota
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;;; first second third fourth fifth sixth seventh eighth ninth tenth
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;;; car+cdr
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;;; take drop
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;;; take-right drop-right
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;;; take! drop-right!
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;;; split-at split-at!
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;;; last last-pair
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;;; zip unzip1 unzip2 unzip3 unzip4 unzip5
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;;; count
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;;; append! append-reverse append-reverse! concatenate concatenate!
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;;; unfold fold pair-fold reduce
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;;; unfold-right fold-right pair-fold-right reduce-right
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;;; append-map append-map! map! pair-for-each filter-map map-in-order
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;;; filter partition remove
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;;; filter! partition! remove!
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;;; find find-tail any every list-index
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;;; take-while drop-while take-while!
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;;; span break span! break!
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;;; delete delete!
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;;; alist-cons alist-copy
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;;; delete-duplicates delete-duplicates!
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;;; alist-delete alist-delete!
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;;; reverse!
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;;; lset<= lset= lset-adjoin
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;;; lset-union lset-intersection lset-difference lset-xor lset-diff+intersection
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;;; lset-union! lset-intersection! lset-difference! lset-xor! lset-diff+intersection!
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;;;
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;;; In principle, the following R4RS list- and pair-processing procedures
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;;; are also part of this package's exports, although they are not defined
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;;; in this file:
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;;; Primitives: cons pair? null? car cdr set-car! set-cdr!
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;;; Non-primitives: list length append reverse cadr ... cddddr list-ref
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;;; memq memv assq assv
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;;; (The non-primitives are defined in this file, but commented out.)
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;;;
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;;; These R4RS procedures have extended definitions in SRFI-1 and are defined
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;;; in this file:
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;;; map for-each member assoc
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;;;
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;;; The remaining two R4RS list-processing procedures are not included:
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;;; list-tail (use drop)
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;;; list? (use proper-list?)
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;;; A note on recursion and iteration/reversal:
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;;; Many iterative list-processing algorithms naturally compute the elements
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;;; of the answer list in the wrong order (left-to-right or head-to-tail) from
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;;; the order needed to cons them into the proper answer (right-to-left, or
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;;; tail-then-head). One style or idiom of programming these algorithms, then,
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;;; loops, consing up the elements in reverse order, then destructively
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;;; reverses the list at the end of the loop. I do not do this. The natural
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;;; and efficient way to code these algorithms is recursively. This trades off
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;;; intermediate temporary list structure for intermediate temporary stack
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;;; structure. In a stack-based system, this improves cache locality and
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;;; lightens the load on the GC system. Don't stand on your head to iterate!
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;;; Recurse, where natural. Multiple-value returns make this even more
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;;; convenient, when the recursion/iteration has multiple state values.
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;;; Porting:
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;;; This is carefully tuned code; do not modify casually.
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;;; - It is careful to share storage when possible;
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;;; - Side-effecting code tries not to perform redundant writes.
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;;;
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;;; That said, a port of this library to a specific Scheme system might wish
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;;; to tune this code to exploit particulars of the implementation.
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;;; The single most important compiler-specific optimisation you could make
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;;; to this library would be to add rewrite rules or transforms to:
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;;; - transform applications of n-ary procedures (e.g. LIST=, CONS*, APPEND,
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;;; LSET-UNION) into multiple applications of a primitive two-argument
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;;; variant.
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;;; - transform applications of the mapping functions (MAP, FOR-EACH, FOLD,
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;;; ANY, EVERY) into open-coded loops. The killer here is that these
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;;; functions are n-ary. Handling the general case is quite inefficient,
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;;; requiring many intermediate data structures to be allocated and
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;;; discarded.
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;;; - transform applications of procedures that take optional arguments
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;;; into calls to variants that do not take optional arguments. This
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;;; eliminates unnecessary consing and parsing of the rest parameter.
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;;;
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;;; These transforms would provide BIG speedups. In particular, the n-ary
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;;; mapping functions are particularly slow and cons-intensive, and are good
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;;; candidates for tuning. I have coded fast paths for the single-list cases,
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;;; but what you really want to do is exploit the fact that the compiler
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;;; usually knows how many arguments are being passed to a particular
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;;; application of these functions -- they are usually explicitly called, not
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;;; passed around as higher-order values. If you can arrange to have your
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;;; compiler produce custom code or custom linkages based on the number of
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;;; arguments in the call, you can speed these functions up a *lot*. But this
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;;; kind of compiler technology no longer exists in the Scheme world as far as
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;;; I can see.
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;;;
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;;; Note that this code is, of course, dependent upon standard bindings for
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;;; the R5RS procedures -- i.e., it assumes that the variable CAR is bound
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;;; to the procedure that takes the car of a list. If your Scheme
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;;; implementation allows user code to alter the bindings of these procedures
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;;; in a manner that would be visible to these definitions, then there might
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;;; be trouble. You could consider horrible kludgery along the lines of
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;;; (define fact
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;;; (let ((= =) (- -) (* *))
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;;; (letrec ((real-fact (lambda (n)
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;;; (if (= n 0) 1 (* n (real-fact (- n 1)))))))
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;;; real-fact)))
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;;; Or you could consider shifting to a reasonable Scheme system that, say,
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;;; has a module system protecting code from this kind of lossage.
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;;;
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;;; This code does a fair amount of run-time argument checking. If your
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;;; Scheme system has a sophisticated compiler that can eliminate redundant
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;;; error checks, this is no problem. However, if not, these checks incur
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;;; some performance overhead -- and, in a safe Scheme implementation, they
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;;; are in some sense redundant: if we don't check to see that the PROC
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;;; parameter is a procedure, we'll find out anyway three lines later when
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;;; we try to call the value. It's pretty easy to rip all this argument
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;;; checking code out if it's inappropriate for your implementation -- just
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;;; nuke every call to CHECK-ARG.
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;;;
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;;; On the other hand, if you *do* have a sophisticated compiler that will
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;;; actually perform soft-typing and eliminate redundant checks (Rice's systems
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;;; being the only possible candidate of which I'm aware), leaving these checks
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;;; in can *help*, since their presence can be elided in redundant cases,
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;;; and in cases where they are needed, performing the checks early, at
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;;; procedure entry, can "lift" a check out of a loop.
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;;;
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;;; Finally, I have only checked the properties that can portably be checked
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;;; with R5RS Scheme -- and this is not complete. You may wish to alter
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;;; the CHECK-ARG parameter checks to perform extra, implementation-specific
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;;; checks, such as procedure arity for higher-order values.
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;;;
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;;; The code has only these non-R4RS dependencies:
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;;; A few calls to an ERROR procedure;
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;;; Uses of the R5RS multiple-value procedure VALUES and the m-v binding
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;;; RECEIVE macro (which isn't R5RS, but is a trivial macro).
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;;; Many calls to a parameter-checking procedure check-arg:
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;;; (define (check-arg pred val caller)
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;;; (let lp ((val val))
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;;; (if (pred val) val (lp (error "Bad argument" val pred caller)))))
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;;; A few uses of the LET-OPTIONAL and :OPTIONAL macros for parsing
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;;; optional arguments.
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;;;
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;;; Most of these procedures use the NULL-LIST? test to trigger the
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;;; base case in the inner loop or recursion. The NULL-LIST? function
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;;; is defined to be a careful one -- it raises an error if passed a
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;;; non-nil, non-pair value. The spec allows an implementation to use
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;;; a less-careful implementation that simply defines NULL-LIST? to
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;;; be NOT-PAIR?. This would speed up the inner loops of these procedures
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;;; at the expense of having them silently accept dotted lists.
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;;; A note on dotted lists:
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;;; I, personally, take the view that the only consistent view of lists
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;;; in Scheme is the view that *everything* is a list -- values such as
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;;; 3 or "foo" or 'bar are simply empty dotted lists. This is due to the
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;;; fact that Scheme actually has no true list type. It has a pair type,
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;;; and there is an *interpretation* of the trees built using this type
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;;; as lists.
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;;;
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;;; I lobbied to have these list-processing procedures hew to this
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;;; view, and accept any value as a list argument. I was overwhelmingly
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;;; overruled during the SRFI discussion phase. So I am inserting this
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;;; text in the reference lib and the SRFI spec as a sort of "minority
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;;; opinion" dissent.
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;;;
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;;; Many of the procedures in this library can be trivially redefined
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;;; to handle dotted lists, just by changing the NULL-LIST? base-case
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;;; check to NOT-PAIR?, meaning that any non-pair value is taken to be
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;;; an empty list. For most of these procedures, that's all that is
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;;; required.
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;;;
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;;; However, we have to do a little more work for some procedures that
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;;; *produce* lists from other lists. Were we to extend these procedures to
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;;; accept dotted lists, we would have to define how they terminate the lists
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;;; produced as results when passed a dotted list. I designed a coherent set
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;;; of termination rules for these cases; this was posted to the SRFI-1
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;;; discussion list. I additionally wrote an earlier version of this library
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;;; that implemented that spec. It has been discarded during later phases of
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;;; the definition and implementation of this library.
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;;;
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;;; The argument *against* defining these procedures to work on dotted
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;;; lists is that dotted lists are the rare, odd case, and that by
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;;; arranging for the procedures to handle them, we lose error checking
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;;; in the cases where a dotted list is passed by accident -- e.g., when
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;;; the programmer swaps a two arguments to a list-processing function,
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;;; one being a scalar and one being a list. For example,
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;;; (member '(1 3 5 7 9) 7)
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;;; This would quietly return #f if we extended MEMBER to accept dotted
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;;; lists.
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;;;
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;;; The SRFI discussion record contains more discussion on this topic.
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;;; Constructors
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;;;;;;;;;;;;;;;;
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;;; Occasionally useful as a value to be passed to a fold or other
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;;; higher-order procedure.
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(define (xcons d a) (cons a d))
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;;;; Recursively copy every cons.
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;(define (tree-copy x)
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; (let recur ((x x))
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; (if (not (pair? x)) x
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; (cons (recur (car x)) (recur (cdr x))))))
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;;; Make a list of length LEN.
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(define (make-list len . maybe-elt)
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(check-arg (lambda (n) (and (integer? n) (>= n 0))) len make-list)
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(let ((elt (cond ((null? maybe-elt) #f) ; Default value
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((null? (cdr maybe-elt)) (car maybe-elt))
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(else (error "Too many arguments to MAKE-LIST"
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(cons len maybe-elt))))))
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(do ((i len (- i 1))
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(ans '() (cons elt ans)))
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((<= i 0) ans))))
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;(define (list . ans) ans) ; R4RS
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;;; Make a list of length LEN. Elt i is (PROC i) for 0 <= i < LEN.
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(define (list-tabulate len proc)
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(check-arg (lambda (n) (and (integer? n) (>= n 0))) len list-tabulate)
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(check-arg procedure? proc list-tabulate)
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(do ((i (- len 1) (- i 1))
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(ans '() (cons (proc i) ans)))
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((< i 0) ans)))
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;;; (cons* a1 a2 ... an) = (cons a1 (cons a2 (cons ... an)))
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;;; (cons* a1) = a1 (cons* a1 a2 ...) = (cons a1 (cons* a2 ...))
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;;;
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;;; (cons first (unfold not-pair? car cdr rest values))
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(define (cons* first . rest)
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(let recur ((x first) (rest rest))
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(if (pair? rest)
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(cons x (recur (car rest) (cdr rest)))
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x)))
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;;; (unfold not-pair? car cdr lis values)
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(define (list-copy lis)
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(let recur ((lis lis))
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(if (pair? lis)
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(cons (car lis) (recur (cdr lis)))
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lis)))
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;;; IOTA count [start step] (start start+step ... start+(count-1)*step)
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(define (iota count . maybe-start+step)
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(check-arg integer? count iota)
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(if (< count 0) (error "Negative step count" iota count))
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; (let-optionals maybe-start+step ((start 0) (step 1)) ...)
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(receive (start step)
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(case (length maybe-start+step)
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((0) (values 0 1))
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((2) (values (car maybe-start+step)
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(cadr maybe-start+step)))
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(else
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(error "wrong number of arguments to IOTA"
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(cons count maybe-start+step))))
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(check-arg number? start iota)
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(check-arg number? step iota)
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(let ((last-val (+ start (* (- count 1) step))))
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(do ((count count (- count 1))
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(val last-val (- val step))
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(ans '() (cons val ans)))
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((<= count 0) ans)))))
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;;; I thought these were lovely, but the public at large did not share my
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;;; enthusiasm...
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;;; :IOTA to (0 ... to-1)
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;;; :IOTA from to (from ... to-1)
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;;; :IOTA from to step (from from+step ...)
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;;; IOTA: to (1 ... to)
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;;; IOTA: from to (from+1 ... to)
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;;; IOTA: from to step (from+step from+2step ...)
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;(define (%parse-iota-args arg1 rest-args proc)
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; (let ((check (lambda (n) (check-arg integer? n proc))))
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; (check arg1)
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; (if (pair? rest-args)
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; (let ((arg2 (check (car rest-args)))
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; (rest (cdr rest-args)))
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; (if (pair? rest)
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; (let ((arg3 (check (car rest)))
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; (rest (cdr rest)))
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; (if (pair? rest) (error "Too many parameters" proc arg1 rest-args)
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; (values arg1 arg2 arg3)))
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; (values arg1 arg2 1)))
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; (values 0 arg1 1))))
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;
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;(define (iota: arg1 . rest-args)
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; (receive (from to step) (%parse-iota-args arg1 rest-args iota:)
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; (let* ((numsteps (floor (/ (- to from) step)))
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; (last-val (+ from (* step numsteps))))
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; (if (< numsteps 0) (error "Negative step count" iota: from to step))
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; (do ((steps-left numsteps (- steps-left 1))
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; (val last-val (- val step))
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; (ans '() (cons val ans)))
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; ((<= steps-left 0) ans)))))
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;
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;
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;(define (:iota arg1 . rest-args)
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; (receive (from to step) (%parse-iota-args arg1 rest-args :iota)
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; (let* ((numsteps (ceiling (/ (- to from) step)))
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; (last-val (+ from (* step (- numsteps 1)))))
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; (if (< numsteps 0) (error "Negative step count" :iota from to step))
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; (do ((steps-left numsteps (- steps-left 1))
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; (val last-val (- val step))
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; (ans '() (cons val ans)))
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; ((<= steps-left 0) ans)))))
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(define (circular-list val1 . vals)
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(let ((ans (cons val1 vals)))
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(set-cdr! (last-pair ans) ans)
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ans))
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;;; <proper-list> ::= () ; Empty proper list
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;;; | (cons <x> <proper-list>) ; Proper-list pair
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;;; Note that this definition rules out circular lists -- and this
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;;; function is required to detect this case and return false.
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(define (proper-list? x)
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(let lp ((x x) (lag x))
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(if (pair? x)
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(let ((x (cdr x)))
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(if (pair? x)
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(let ((x (cdr x))
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(lag (cdr lag)))
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(and (not (eq? x lag)) (lp x lag)))
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(null? x)))
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(null? x))))
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;;; A dotted list is a finite list (possibly of length 0) terminated
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;;; by a non-nil value. Any non-cons, non-nil value (e.g., "foo" or 5)
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;;; is a dotted list of length 0.
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;;;
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;;; <dotted-list> ::= <non-nil,non-pair> ; Empty dotted list
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;;; | (cons <x> <dotted-list>) ; Proper-list pair
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(define (dotted-list? x)
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(let lp ((x x) (lag x))
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(if (pair? x)
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(let ((x (cdr x)))
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(if (pair? x)
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(let ((x (cdr x))
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(lag (cdr lag)))
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(and (not (eq? x lag)) (lp x lag)))
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(not (null? x))))
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(not (null? x)))))
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(define (circular-list? x)
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(let lp ((x x) (lag x))
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(and (pair? x)
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(let ((x (cdr x)))
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(and (pair? x)
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(let ((x (cdr x))
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(lag (cdr lag)))
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(or (eq? x lag) (lp x lag))))))))
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(define (not-pair? x) (not (pair? x))) ; Inline me.
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;;; This is a legal definition which is fast and sloppy:
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;;; (define null-list? not-pair?)
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;;; but we'll provide a more careful one:
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(define (null-list? l)
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(cond ((pair? l) #f)
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((null? l) #t)
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(else (error "null-list?: argument out of domain" l))))
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(define (list= = . lists)
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(or (null? lists) ; special case
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(let lp1 ((list-a (car lists)) (others (cdr lists)))
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(or (null? others)
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(let ((list-b (car others))
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(others (cdr others)))
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(if (eq? list-a list-b) ; EQ? => LIST=
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(lp1 list-b others)
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(let lp2 ((list-a list-a) (list-b list-b))
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(if (null-list? list-a)
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(and (null-list? list-b)
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(lp1 list-b others))
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(and (not (null-list? list-b))
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(= (car list-a) (car list-b))
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(lp2 (cdr list-a) (cdr list-b)))))))))))
|
|
|
|
|
|
|
|
;;; R4RS, so commented out.
|
|
;(define (length x) ; LENGTH may diverge or
|
|
; (let lp ((x x) (len 0)) ; raise an error if X is
|
|
; (if (pair? x) ; a circular list. This version
|
|
; (lp (cdr x) (+ len 1)) ; diverges.
|
|
; len)))
|
|
|
|
(define (length+ x) ; Returns #f if X is circular.
|
|
(let lp ((x x) (lag x) (len 0))
|
|
(if (pair? x)
|
|
(let ((x (cdr x))
|
|
(len (+ len 1)))
|
|
(if (pair? x)
|
|
(let ((x (cdr x))
|
|
(lag (cdr lag))
|
|
(len (+ len 1)))
|
|
(and (not (eq? x lag)) (lp x lag len)))
|
|
len))
|
|
len)))
|
|
|
|
(define (zip list1 . more-lists) (apply map list list1 more-lists))
|
|
|
|
|
|
;;; Selectors
|
|
;;;;;;;;;;;;;
|
|
|
|
;;; R4RS non-primitives:
|
|
;(define (caar x) (car (car x)))
|
|
;(define (cadr x) (car (cdr x)))
|
|
;(define (cdar x) (cdr (car x)))
|
|
;(define (cddr x) (cdr (cdr x)))
|
|
;
|
|
;(define (caaar x) (caar (car x)))
|
|
;(define (caadr x) (caar (cdr x)))
|
|
;(define (cadar x) (cadr (car x)))
|
|
;(define (caddr x) (cadr (cdr x)))
|
|
;(define (cdaar x) (cdar (car x)))
|
|
;(define (cdadr x) (cdar (cdr x)))
|
|
;(define (cddar x) (cddr (car x)))
|
|
;(define (cdddr x) (cddr (cdr x)))
|
|
;
|
|
;(define (caaaar x) (caaar (car x)))
|
|
;(define (caaadr x) (caaar (cdr x)))
|
|
;(define (caadar x) (caadr (car x)))
|
|
;(define (caaddr x) (caadr (cdr x)))
|
|
;(define (cadaar x) (cadar (car x)))
|
|
;(define (cadadr x) (cadar (cdr x)))
|
|
;(define (caddar x) (caddr (car x)))
|
|
;(define (cadddr x) (caddr (cdr x)))
|
|
;(define (cdaaar x) (cdaar (car x)))
|
|
;(define (cdaadr x) (cdaar (cdr x)))
|
|
;(define (cdadar x) (cdadr (car x)))
|
|
;(define (cdaddr x) (cdadr (cdr x)))
|
|
;(define (cddaar x) (cddar (car x)))
|
|
;(define (cddadr x) (cddar (cdr x)))
|
|
;(define (cdddar x) (cdddr (car x)))
|
|
;(define (cddddr x) (cdddr (cdr x)))
|
|
|
|
|
|
(define first car)
|
|
(define second cadr)
|
|
(define third caddr)
|
|
(define fourth cadddr)
|
|
(define (fifth x) (car (cddddr x)))
|
|
(define (sixth x) (cadr (cddddr x)))
|
|
(define (seventh x) (caddr (cddddr x)))
|
|
(define (eighth x) (cadddr (cddddr x)))
|
|
(define (ninth x) (car (cddddr (cddddr x))))
|
|
(define (tenth x) (cadr (cddddr (cddddr x))))
|
|
|
|
(define (car+cdr pair) (values (car pair) (cdr pair)))
|
|
|
|
;;; take & drop
|
|
|
|
(define (take lis k)
|
|
(check-arg integer? k take)
|
|
(let recur ((lis lis) (k k))
|
|
(if (zero? k) '()
|
|
(cons (car lis)
|
|
(recur (cdr lis) (- k 1))))))
|
|
|
|
(define (drop lis k)
|
|
(check-arg integer? k drop)
|
|
(let iter ((lis lis) (k k))
|
|
(if (zero? k) lis (iter (cdr lis) (- k 1)))))
|
|
|
|
(define (take! lis k)
|
|
(check-arg integer? k take!)
|
|
(if (zero? k) '()
|
|
(begin (set-cdr! (drop lis (- k 1)) '())
|
|
lis)))
|
|
|
|
;;; TAKE-RIGHT and DROP-RIGHT work by getting two pointers into the list,
|
|
;;; off by K, then chasing down the list until the lead pointer falls off
|
|
;;; the end.
|
|
|
|
(define (take-right lis k)
|
|
(check-arg integer? k take-right)
|
|
(let lp ((lag lis) (lead (drop lis k)))
|
|
(if (pair? lead)
|
|
(lp (cdr lag) (cdr lead))
|
|
lag)))
|
|
|
|
(define (drop-right lis k)
|
|
(check-arg integer? k drop-right)
|
|
(let recur ((lag lis) (lead (drop lis k)))
|
|
(if (pair? lead)
|
|
(cons (car lag) (recur (cdr lag) (cdr lead)))
|
|
'())))
|
|
|
|
;;; In this function, LEAD is actually K+1 ahead of LAG. This lets
|
|
;;; us stop LAG one step early, in time to smash its cdr to ().
|
|
(define (drop-right! lis k)
|
|
(check-arg integer? k drop-right!)
|
|
(let ((lead (drop lis k)))
|
|
(if (pair? lead)
|
|
|
|
(let lp ((lag lis) (lead (cdr lead))) ; Standard case
|
|
(if (pair? lead)
|
|
(lp (cdr lag) (cdr lead))
|
|
(begin (set-cdr! lag '())
|
|
lis)))
|
|
|
|
'()))) ; Special case dropping everything -- no cons to side-effect.
|
|
|
|
;(define (list-ref lis i) (car (drop lis i))) ; R4RS
|
|
|
|
;;; These use the APL convention, whereby negative indices mean
|
|
;;; "from the right." I liked them, but they didn't win over the
|
|
;;; SRFI reviewers.
|
|
;;; K >= 0: Take and drop K elts from the front of the list.
|
|
;;; K <= 0: Take and drop -K elts from the end of the list.
|
|
|
|
;(define (take lis k)
|
|
; (check-arg integer? k take)
|
|
; (if (negative? k)
|
|
; (list-tail lis (+ k (length lis)))
|
|
; (let recur ((lis lis) (k k))
|
|
; (if (zero? k) '()
|
|
; (cons (car lis)
|
|
; (recur (cdr lis) (- k 1)))))))
|
|
;
|
|
;(define (drop lis k)
|
|
; (check-arg integer? k drop)
|
|
; (if (negative? k)
|
|
; (let recur ((lis lis) (nelts (+ k (length lis))))
|
|
; (if (zero? nelts) '()
|
|
; (cons (car lis)
|
|
; (recur (cdr lis) (- nelts 1)))))
|
|
; (list-tail lis k)))
|
|
;
|
|
;
|
|
;(define (take! lis k)
|
|
; (check-arg integer? k take!)
|
|
; (cond ((zero? k) '())
|
|
; ((positive? k)
|
|
; (set-cdr! (list-tail lis (- k 1)) '())
|
|
; lis)
|
|
; (else (list-tail lis (+ k (length lis))))))
|
|
;
|
|
;(define (drop! lis k)
|
|
; (check-arg integer? k drop!)
|
|
; (if (negative? k)
|
|
; (let ((nelts (+ k (length lis))))
|
|
; (if (zero? nelts) '()
|
|
; (begin (set-cdr! (list-tail lis (- nelts 1)) '())
|
|
; lis)))
|
|
; (list-tail lis k)))
|
|
|
|
(define (split-at x k)
|
|
(check-arg integer? k split-at)
|
|
(let recur ((lis x) (k k))
|
|
(if (zero? k) (values '() lis)
|
|
(receive (prefix suffix) (recur (cdr lis) (- k 1))
|
|
(values (cons (car lis) prefix) suffix)))))
|
|
|
|
(define (split-at! x k)
|
|
(check-arg integer? k split-at!)
|
|
(if (zero? k) (values '() x)
|
|
(let* ((prev (drop x (- k 1)))
|
|
(suffix (cdr prev)))
|
|
(set-cdr! prev '())
|
|
(values x suffix))))
|
|
|
|
|
|
(define (last lis) (car (last-pair lis)))
|
|
|
|
(define (last-pair lis)
|
|
(check-arg pair? lis last-pair)
|
|
(let lp ((lis lis))
|
|
(let ((tail (cdr lis)))
|
|
(if (pair? tail) (lp tail) lis))))
|
|
|
|
|
|
;;; Unzippers -- 1 through 5
|
|
;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
|
|
|
|
(define (unzip1 lis) (map car lis))
|
|
|
|
(define (unzip2 lis)
|
|
(let recur ((lis lis))
|
|
(if (null-list? lis) (values lis lis) ; Use NOT-PAIR? to handle
|
|
(let ((elt (car lis))) ; dotted lists.
|
|
(receive (a b) (recur (cdr lis))
|
|
(values (cons (car elt) a)
|
|
(cons (cadr elt) b)))))))
|
|
|
|
(define (unzip3 lis)
|
|
(let recur ((lis lis))
|
|
(if (null-list? lis) (values lis lis lis)
|
|
(let ((elt (car lis)))
|
|
(receive (a b c) (recur (cdr lis))
|
|
(values (cons (car elt) a)
|
|
(cons (cadr elt) b)
|
|
(cons (caddr elt) c)))))))
|
|
|
|
(define (unzip4 lis)
|
|
(let recur ((lis lis))
|
|
(if (null-list? lis) (values lis lis lis lis)
|
|
(let ((elt (car lis)))
|
|
(receive (a b c d) (recur (cdr lis))
|
|
(values (cons (car elt) a)
|
|
(cons (cadr elt) b)
|
|
(cons (caddr elt) c)
|
|
(cons (cadddr elt) d)))))))
|
|
|
|
(define (unzip5 lis)
|
|
(let recur ((lis lis))
|
|
(if (null-list? lis) (values lis lis lis lis lis)
|
|
(let ((elt (car lis)))
|
|
(receive (a b c d e) (recur (cdr lis))
|
|
(values (cons (car elt) a)
|
|
(cons (cadr elt) b)
|
|
(cons (caddr elt) c)
|
|
(cons (cadddr elt) d)
|
|
(cons (car (cddddr elt)) e)))))))
|
|
|
|
|
|
;;; append! append-reverse append-reverse! concatenate concatenate!
|
|
;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
|
|
|
|
(define (append! . lists)
|
|
;; First, scan through lists looking for a non-empty one.
|
|
(let lp ((lists lists) (prev '()))
|
|
(if (not (pair? lists)) prev
|
|
(let ((first (car lists))
|
|
(rest (cdr lists)))
|
|
(if (not (pair? first)) (lp rest first)
|
|
|
|
;; Now, do the splicing.
|
|
(let lp2 ((tail-cons (last-pair first))
|
|
(rest rest))
|
|
(if (pair? rest)
|
|
(let ((next (car rest))
|
|
(rest (cdr rest)))
|
|
(set-cdr! tail-cons next)
|
|
(lp2 (if (pair? next) (last-pair next) tail-cons)
|
|
rest))
|
|
first)))))))
|
|
|
|
;;; APPEND is R4RS.
|
|
;(define (append . lists)
|
|
; (if (pair? lists)
|
|
; (let recur ((list1 (car lists)) (lists (cdr lists)))
|
|
; (if (pair? lists)
|
|
; (let ((tail (recur (car lists) (cdr lists))))
|
|
; (fold-right cons tail list1)) ; Append LIST1 & TAIL.
|
|
; list1))
|
|
; '()))
|
|
|
|
;(define (append-reverse rev-head tail) (fold cons tail rev-head))
|
|
|
|
;(define (append-reverse! rev-head tail)
|
|
; (pair-fold (lambda (pair tail) (set-cdr! pair tail) pair)
|
|
; tail
|
|
; rev-head))
|
|
|
|
;;; Hand-inline the FOLD and PAIR-FOLD ops for speed.
|
|
|
|
(define (append-reverse rev-head tail)
|
|
(let lp ((rev-head rev-head) (tail tail))
|
|
(if (null-list? rev-head) tail
|
|
(lp (cdr rev-head) (cons (car rev-head) tail)))))
|
|
|
|
(define (append-reverse! rev-head tail)
|
|
(let lp ((rev-head rev-head) (tail tail))
|
|
(if (null-list? rev-head) tail
|
|
(let ((next-rev (cdr rev-head)))
|
|
(set-cdr! rev-head tail)
|
|
(lp next-rev rev-head)))))
|
|
|
|
|
|
(define (concatenate lists) (reduce-right append '() lists))
|
|
(define (concatenate! lists) (reduce-right append! '() lists))
|
|
|
|
;;; Fold/map internal utilities
|
|
;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
|
|
;;; These little internal utilities are used by the general
|
|
;;; fold & mapper funs for the n-ary cases . It'd be nice if they got inlined.
|
|
;;; One the other hand, the n-ary cases are painfully inefficient as it is.
|
|
;;; An aggressive implementation should simply re-write these functions
|
|
;;; for raw efficiency; I have written them for as much clarity, portability,
|
|
;;; and simplicity as can be achieved.
|
|
;;;
|
|
;;; I use the dreaded call/cc to do local aborts. A good compiler could
|
|
;;; handle this with extreme efficiency. An implementation that provides
|
|
;;; a one-shot, non-persistent continuation grabber could help the compiler
|
|
;;; out by using that in place of the call/cc's in these routines.
|
|
;;;
|
|
;;; These functions have funky definitions that are precisely tuned to
|
|
;;; the needs of the fold/map procs -- for example, to minimize the number
|
|
;;; of times the argument lists need to be examined.
|
|
|
|
;;; Return (map cdr lists).
|
|
;;; However, if any element of LISTS is empty, just abort and return '().
|
|
(define (%cdrs lists)
|
|
(call-with-current-continuation
|
|
(lambda (abort)
|
|
(let recur ((lists lists))
|
|
(if (pair? lists)
|
|
(let ((lis (car lists)))
|
|
(if (null-list? lis) (abort '())
|
|
(cons (cdr lis) (recur (cdr lists)))))
|
|
'())))))
|
|
|
|
(define (%cars+ lists last-elt) ; (append! (map car lists) (list last-elt))
|
|
(let recur ((lists lists))
|
|
(if (pair? lists) (cons (caar lists) (recur (cdr lists))) (list last-elt))))
|
|
|
|
;;; LISTS is a (not very long) non-empty list of lists.
|
|
;;; Return two lists: the cars & the cdrs of the lists.
|
|
;;; However, if any of the lists is empty, just abort and return [() ()].
|
|
|
|
(define (%cars+cdrs lists)
|
|
(call-with-current-continuation
|
|
(lambda (abort)
|
|
(let recur ((lists lists))
|
|
(if (pair? lists)
|
|
(receive (list other-lists) (car+cdr lists)
|
|
(if (null-list? list) (abort '() '()) ; LIST is empty -- bail out
|
|
(receive (a d) (car+cdr list)
|
|
(receive (cars cdrs) (recur other-lists)
|
|
(values (cons a cars) (cons d cdrs))))))
|
|
(values '() '()))))))
|
|
|
|
;;; Like %CARS+CDRS, but we pass in a final elt tacked onto the end of the
|
|
;;; cars list. What a hack.
|
|
(define (%cars+cdrs+ lists cars-final)
|
|
(call-with-current-continuation
|
|
(lambda (abort)
|
|
(let recur ((lists lists))
|
|
(if (pair? lists)
|
|
(receive (list other-lists) (car+cdr lists)
|
|
(if (null-list? list) (abort '() '()) ; LIST is empty -- bail out
|
|
(receive (a d) (car+cdr list)
|
|
(receive (cars cdrs) (recur other-lists)
|
|
(values (cons a cars) (cons d cdrs))))))
|
|
(values (list cars-final) '()))))))
|
|
|
|
;;; Like %CARS+CDRS, but blow up if any list is empty.
|
|
(define (%cars+cdrs/no-test lists)
|
|
(let recur ((lists lists))
|
|
(if (pair? lists)
|
|
(receive (list other-lists) (car+cdr lists)
|
|
(receive (a d) (car+cdr list)
|
|
(receive (cars cdrs) (recur other-lists)
|
|
(values (cons a cars) (cons d cdrs)))))
|
|
(values '() '()))))
|
|
|
|
|
|
;;; count
|
|
;;;;;;;;;
|
|
(define (count pred list1 . lists)
|
|
(check-arg procedure? pred count)
|
|
(if (pair? lists)
|
|
|
|
;; N-ary case
|
|
(let lp ((list1 list1) (lists lists) (i 0))
|
|
(if (null-list? list1) i
|
|
(receive (as ds) (%cars+cdrs lists)
|
|
(if (null? as) i
|
|
(lp (cdr list1) ds
|
|
(if (apply pred (car list1) as) (+ i 1) i))))))
|
|
|
|
;; Fast path
|
|
(let lp ((lis list1) (i 0))
|
|
(if (null-list? lis) i
|
|
(lp (cdr lis) (if (pred (car lis)) (+ i 1) i))))))
|
|
|
|
|
|
;;; fold/unfold
|
|
;;;;;;;;;;;;;;;
|
|
|
|
(define (unfold-right p f g seed . maybe-tail)
|
|
(check-arg procedure? p unfold-right)
|
|
(check-arg procedure? f unfold-right)
|
|
(check-arg procedure? g unfold-right)
|
|
(let lp ((seed seed) (ans (:optional maybe-tail '())))
|
|
(if (p seed) ans
|
|
(lp (g seed)
|
|
(cons (f seed) ans)))))
|
|
|
|
|
|
(define (unfold p f g seed . maybe-tail-gen)
|
|
(check-arg procedure? p unfold)
|
|
(check-arg procedure? f unfold)
|
|
(check-arg procedure? g unfold)
|
|
(if (pair? maybe-tail-gen)
|
|
|
|
(let ((tail-gen (car maybe-tail-gen)))
|
|
(if (pair? (cdr maybe-tail-gen))
|
|
(apply error "Too many arguments" unfold p f g seed maybe-tail-gen)
|
|
|
|
(let recur ((seed seed))
|
|
(if (p seed) (tail-gen seed)
|
|
(cons (f seed) (recur (g seed)))))))
|
|
|
|
(let recur ((seed seed))
|
|
(if (p seed) '()
|
|
(cons (f seed) (recur (g seed)))))))
|
|
|
|
|
|
(define (fold kons knil lis1 . lists)
|
|
(check-arg procedure? kons fold)
|
|
(if (pair? lists)
|
|
(let lp ((lists (cons lis1 lists)) (ans knil)) ; N-ary case
|
|
(receive (cars+ans cdrs) (%cars+cdrs+ lists ans)
|
|
(if (null? cars+ans) ans ; Done.
|
|
(lp cdrs (apply kons cars+ans)))))
|
|
|
|
(let lp ((lis lis1) (ans knil)) ; Fast path
|
|
(if (null-list? lis) ans
|
|
(lp (cdr lis) (kons (car lis) ans))))))
|
|
|
|
|
|
(define (fold-right kons knil lis1 . lists)
|
|
(check-arg procedure? kons fold-right)
|
|
(if (pair? lists)
|
|
(let recur ((lists (cons lis1 lists))) ; N-ary case
|
|
(let ((cdrs (%cdrs lists)))
|
|
(if (null? cdrs) knil
|
|
(apply kons (%cars+ lists (recur cdrs))))))
|
|
|
|
(let recur ((lis lis1)) ; Fast path
|
|
(if (null-list? lis) knil
|
|
(let ((head (car lis)))
|
|
(kons head (recur (cdr lis))))))))
|
|
|
|
|
|
(define (pair-fold-right f zero lis1 . lists)
|
|
(check-arg procedure? f pair-fold-right)
|
|
(if (pair? lists)
|
|
(let recur ((lists (cons lis1 lists))) ; N-ary case
|
|
(let ((cdrs (%cdrs lists)))
|
|
(if (null? cdrs) zero
|
|
(apply f (append! lists (list (recur cdrs)))))))
|
|
|
|
(let recur ((lis lis1)) ; Fast path
|
|
(if (null-list? lis) zero (f lis (recur (cdr lis)))))))
|
|
|
|
(define (pair-fold f zero lis1 . lists)
|
|
(check-arg procedure? f pair-fold)
|
|
(if (pair? lists)
|
|
(let lp ((lists (cons lis1 lists)) (ans zero)) ; N-ary case
|
|
(let ((tails (%cdrs lists)))
|
|
(if (null? tails) ans
|
|
(lp tails (apply f (append! lists (list ans)))))))
|
|
|
|
(let lp ((lis lis1) (ans zero))
|
|
(if (null-list? lis) ans
|
|
(let ((tail (cdr lis))) ; Grab the cdr now,
|
|
(lp tail (f lis ans))))))) ; in case F SET-CDR!s LIS.
|
|
|
|
|
|
;;; REDUCE and REDUCE-RIGHT only use RIDENTITY in the empty-list case.
|
|
;;; These cannot meaningfully be n-ary.
|
|
|
|
(define (reduce f ridentity lis)
|
|
(check-arg procedure? f reduce)
|
|
(if (null-list? lis) ridentity
|
|
(fold f (car lis) (cdr lis))))
|
|
|
|
(define (reduce-right f ridentity lis)
|
|
(check-arg procedure? f reduce-right)
|
|
(if (null-list? lis) ridentity
|
|
(let recur ((head (car lis)) (lis (cdr lis)))
|
|
(if (pair? lis)
|
|
(f head (recur (car lis) (cdr lis)))
|
|
head))))
|
|
|
|
|
|
|
|
;;; Mappers: append-map append-map! pair-for-each map! filter-map map-in-order
|
|
;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
|
|
|
|
(define (append-map f lis1 . lists)
|
|
(really-append-map append-map append f lis1 lists))
|
|
(define (append-map! f lis1 . lists)
|
|
(really-append-map append-map! append! f lis1 lists))
|
|
|
|
(define (really-append-map who appender f lis1 lists)
|
|
(check-arg procedure? f who)
|
|
(if (pair? lists)
|
|
(receive (cars cdrs) (%cars+cdrs (cons lis1 lists))
|
|
(if (null? cars) '()
|
|
(let recur ((cars cars) (cdrs cdrs))
|
|
(let ((vals (apply f cars)))
|
|
(receive (cars2 cdrs2) (%cars+cdrs cdrs)
|
|
(if (null? cars2) vals
|
|
(appender vals (recur cars2 cdrs2))))))))
|
|
|
|
;; Fast path
|
|
(if (null-list? lis1) '()
|
|
(let recur ((elt (car lis1)) (rest (cdr lis1)))
|
|
(let ((vals (f elt)))
|
|
(if (null-list? rest) vals
|
|
(appender vals (recur (car rest) (cdr rest)))))))))
|
|
|
|
|
|
(define (pair-for-each proc lis1 . lists)
|
|
(check-arg procedure? proc pair-for-each)
|
|
(if (pair? lists)
|
|
|
|
(let lp ((lists (cons lis1 lists)))
|
|
(let ((tails (%cdrs lists)))
|
|
(if (pair? tails)
|
|
(begin (apply proc lists)
|
|
(lp tails)))))
|
|
|
|
;; Fast path.
|
|
(let lp ((lis lis1))
|
|
(if (not (null-list? lis))
|
|
(let ((tail (cdr lis))) ; Grab the cdr now,
|
|
(proc lis) ; in case PROC SET-CDR!s LIS.
|
|
(lp tail))))))
|
|
|
|
;;; We stop when LIS1 runs out, not when any list runs out.
|
|
(define (map! f lis1 . lists)
|
|
(check-arg procedure? f map!)
|
|
(if (pair? lists)
|
|
(let lp ((lis1 lis1) (lists lists))
|
|
(if (not (null-list? lis1))
|
|
(receive (heads tails) (%cars+cdrs/no-test lists)
|
|
(set-car! lis1 (apply f (car lis1) heads))
|
|
(lp (cdr lis1) tails))))
|
|
|
|
;; Fast path.
|
|
(pair-for-each (lambda (pair) (set-car! pair (f (car pair)))) lis1))
|
|
lis1)
|
|
|
|
|
|
;;; Map F across L, and save up all the non-false results.
|
|
(define (filter-map f lis1 . lists)
|
|
(check-arg procedure? f filter-map)
|
|
(if (pair? lists)
|
|
(let recur ((lists (cons lis1 lists)))
|
|
(receive (cars cdrs) (%cars+cdrs lists)
|
|
(if (pair? cars)
|
|
(cond ((apply f cars) => (lambda (x) (cons x (recur cdrs))))
|
|
(else (recur cdrs))) ; Tail call in this arm.
|
|
'())))
|
|
|
|
;; Fast path.
|
|
(let recur ((lis lis1))
|
|
(if (null-list? lis) lis
|
|
(let ((tail (recur (cdr lis))))
|
|
(cond ((f (car lis)) => (lambda (x) (cons x tail)))
|
|
(else tail)))))))
|
|
|
|
|
|
;;; Map F across lists, guaranteeing to go left-to-right.
|
|
;;; NOTE: Some implementations of R5RS MAP are compliant with this spec;
|
|
;;; in which case this procedure may simply be defined as a synonym for MAP.
|
|
|
|
(define (map-in-order f lis1 . lists)
|
|
(check-arg procedure? f map-in-order)
|
|
(if (pair? lists)
|
|
(let recur ((lists (cons lis1 lists)))
|
|
(receive (cars cdrs) (%cars+cdrs lists)
|
|
(if (pair? cars)
|
|
(let ((x (apply f cars))) ; Do head first,
|
|
(cons x (recur cdrs))) ; then tail.
|
|
'())))
|
|
|
|
;; Fast path.
|
|
(let recur ((lis lis1))
|
|
(if (null-list? lis) lis
|
|
(let ((tail (cdr lis))
|
|
(x (f (car lis)))) ; Do head first,
|
|
(cons x (recur tail))))))) ; then tail.
|
|
|
|
|
|
;;; We extend MAP to handle arguments of unequal length.
|
|
(define map map-in-order)
|
|
|
|
;;; Apply F across lists, guaranteeing to go left-to-right.
|
|
;;; NOTE: Some implementations of R5RS MAP are compliant with this spec;
|
|
;;; in which case this procedure may simply be defined as a synonym for FOR-EACH.
|
|
|
|
(define (for-each f lis1 . lists)
|
|
(check-arg procedure? f for-each)
|
|
(if (pair? lists)
|
|
(let recur ((lists (cons lis1 lists)))
|
|
(receive (cars cdrs) (%cars+cdrs lists)
|
|
(if (pair? cars)
|
|
(begin
|
|
(apply f cars) ; Do head first,
|
|
(recur cdrs))))) ; then tail.
|
|
|
|
;; Fast path.
|
|
(let recur ((lis lis1))
|
|
(if (not (null-list? lis))
|
|
(begin
|
|
(f (car lis)) ; Do head first,
|
|
(recur (cdr lis))))))) ; then tail.
|
|
|
|
;;; filter, remove, partition
|
|
;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
|
|
;;; FILTER, REMOVE, PARTITION and their destructive counterparts do not
|
|
;;; disorder the elements of their argument.
|
|
|
|
;; This FILTER shares the longest tail of L that has no deleted elements.
|
|
;; If Scheme had multi-continuation calls, they could be made more efficient.
|
|
|
|
(define (filter pred lis) ; Sleazing with EQ? makes this
|
|
(check-arg procedure? pred filter) ; one faster.
|
|
(let recur ((lis lis))
|
|
(if (null-list? lis) lis ; Use NOT-PAIR? to handle dotted lists.
|
|
(let ((head (car lis))
|
|
(tail (cdr lis)))
|
|
(if (pred head)
|
|
(let ((new-tail (recur tail))) ; Replicate the RECUR call so
|
|
(if (eq? tail new-tail) lis
|
|
(cons head new-tail)))
|
|
(recur tail)))))) ; this one can be a tail call.
|
|
|
|
|
|
;;; Another version that shares longest tail.
|
|
;(define (filter pred lis)
|
|
; (receive (ans no-del?)
|
|
; ;; (recur l) returns L with (pred x) values filtered.
|
|
; ;; It also returns a flag NO-DEL? if the returned value
|
|
; ;; is EQ? to L, i.e. if it didn't have to delete anything.
|
|
; (let recur ((l l))
|
|
; (if (null-list? l) (values l #t)
|
|
; (let ((x (car l))
|
|
; (tl (cdr l)))
|
|
; (if (pred x)
|
|
; (receive (ans no-del?) (recur tl)
|
|
; (if no-del?
|
|
; (values l #t)
|
|
; (values (cons x ans) #f)))
|
|
; (receive (ans no-del?) (recur tl) ; Delete X.
|
|
; (values ans #f))))))
|
|
; ans))
|
|
|
|
|
|
|
|
;(define (filter! pred lis) ; Things are much simpler
|
|
; (let recur ((lis lis)) ; if you are willing to
|
|
; (if (pair? lis) ; push N stack frames & do N
|
|
; (cond ((pred (car lis)) ; SET-CDR! writes, where N is
|
|
; (set-cdr! lis (recur (cdr lis))); the length of the answer.
|
|
; lis)
|
|
; (else (recur (cdr lis))))
|
|
; lis)))
|
|
|
|
|
|
;;; This implementation of FILTER!
|
|
;;; - doesn't cons, and uses no stack;
|
|
;;; - is careful not to do redundant SET-CDR! writes, as writes to memory are
|
|
;;; usually expensive on modern machines, and can be extremely expensive on
|
|
;;; modern Schemes (e.g., ones that have generational GC's).
|
|
;;; It just zips down contiguous runs of in and out elts in LIS doing the
|
|
;;; minimal number of SET-CDR!s to splice the tail of one run of ins to the
|
|
;;; beginning of the next.
|
|
|
|
(define (filter! pred lis)
|
|
(check-arg procedure? pred filter!)
|
|
(let lp ((ans lis))
|
|
(cond ((null-list? ans) ans) ; Scan looking for
|
|
((not (pred (car ans))) (lp (cdr ans))) ; first cons of result.
|
|
|
|
;; ANS is the eventual answer.
|
|
;; SCAN-IN: (CDR PREV) = LIS and (CAR PREV) satisfies PRED.
|
|
;; Scan over a contiguous segment of the list that
|
|
;; satisfies PRED.
|
|
;; SCAN-OUT: (CAR PREV) satisfies PRED. Scan over a contiguous
|
|
;; segment of the list that *doesn't* satisfy PRED.
|
|
;; When the segment ends, patch in a link from PREV
|
|
;; to the start of the next good segment, and jump to
|
|
;; SCAN-IN.
|
|
(else (letrec ((scan-in (lambda (prev lis)
|
|
(if (pair? lis)
|
|
(if (pred (car lis))
|
|
(scan-in lis (cdr lis))
|
|
(scan-out prev (cdr lis))))))
|
|
(scan-out (lambda (prev lis)
|
|
(let lp ((lis lis))
|
|
(if (pair? lis)
|
|
(if (pred (car lis))
|
|
(begin (set-cdr! prev lis)
|
|
(scan-in lis (cdr lis)))
|
|
(lp (cdr lis)))
|
|
(set-cdr! prev lis))))))
|
|
(scan-in ans (cdr ans))
|
|
ans)))))
|
|
|
|
|
|
|
|
;;; Answers share common tail with LIS where possible;
|
|
;;; the technique is slightly subtle.
|
|
|
|
(define (partition pred lis)
|
|
(check-arg procedure? pred partition)
|
|
(let recur ((lis lis))
|
|
(if (null-list? lis) (values lis lis) ; Use NOT-PAIR? to handle dotted lists.
|
|
(let ((elt (car lis))
|
|
(tail (cdr lis)))
|
|
(receive (in out) (recur tail)
|
|
(if (pred elt)
|
|
(values (if (pair? out) (cons elt in) lis) out)
|
|
(values in (if (pair? in) (cons elt out) lis))))))))
|
|
|
|
|
|
|
|
;(define (partition! pred lis) ; Things are much simpler
|
|
; (let recur ((lis lis)) ; if you are willing to
|
|
; (if (null-list? lis) (values lis lis) ; push N stack frames & do N
|
|
; (let ((elt (car lis))) ; SET-CDR! writes, where N is
|
|
; (receive (in out) (recur (cdr lis)) ; the length of LIS.
|
|
; (cond ((pred elt)
|
|
; (set-cdr! lis in)
|
|
; (values lis out))
|
|
; (else (set-cdr! lis out)
|
|
; (values in lis))))))))
|
|
|
|
|
|
;;; This implementation of PARTITION!
|
|
;;; - doesn't cons, and uses no stack;
|
|
;;; - is careful not to do redundant SET-CDR! writes, as writes to memory are
|
|
;;; usually expensive on modern machines, and can be extremely expensive on
|
|
;;; modern Schemes (e.g., ones that have generational GC's).
|
|
;;; It just zips down contiguous runs of in and out elts in LIS doing the
|
|
;;; minimal number of SET-CDR!s to splice these runs together into the result
|
|
;;; lists.
|
|
|
|
(define (partition! pred lis)
|
|
(check-arg procedure? pred partition!)
|
|
(if (null-list? lis) (values lis lis)
|
|
|
|
;; This pair of loops zips down contiguous in & out runs of the
|
|
;; list, splicing the runs together. The invariants are
|
|
;; SCAN-IN: (cdr in-prev) = LIS.
|
|
;; SCAN-OUT: (cdr out-prev) = LIS.
|
|
(letrec ((scan-in (lambda (in-prev out-prev lis)
|
|
(let lp ((in-prev in-prev) (lis lis))
|
|
(if (pair? lis)
|
|
(if (pred (car lis))
|
|
(lp lis (cdr lis))
|
|
(begin (set-cdr! out-prev lis)
|
|
(scan-out in-prev lis (cdr lis))))
|
|
(set-cdr! out-prev lis))))) ; Done.
|
|
|
|
(scan-out (lambda (in-prev out-prev lis)
|
|
(let lp ((out-prev out-prev) (lis lis))
|
|
(if (pair? lis)
|
|
(if (pred (car lis))
|
|
(begin (set-cdr! in-prev lis)
|
|
(scan-in lis out-prev (cdr lis)))
|
|
(lp lis (cdr lis)))
|
|
(set-cdr! in-prev lis)))))) ; Done.
|
|
|
|
;; Crank up the scan&splice loops.
|
|
(if (pred (car lis))
|
|
;; LIS begins in-list. Search for out-list's first pair.
|
|
(let lp ((prev-l lis) (l (cdr lis)))
|
|
(cond ((not (pair? l)) (values lis l))
|
|
((pred (car l)) (lp l (cdr l)))
|
|
(else (scan-out prev-l l (cdr l))
|
|
(values lis l)))) ; Done.
|
|
|
|
;; LIS begins out-list. Search for in-list's first pair.
|
|
(let lp ((prev-l lis) (l (cdr lis)))
|
|
(cond ((not (pair? l)) (values l lis))
|
|
((pred (car l))
|
|
(scan-in l prev-l (cdr l))
|
|
(values l lis)) ; Done.
|
|
(else (lp l (cdr l)))))))))
|
|
|
|
|
|
;;; Inline us, please.
|
|
(define (remove pred l) (filter (lambda (x) (not (pred x))) l))
|
|
(define (remove! pred l) (filter! (lambda (x) (not (pred x))) l))
|
|
|
|
|
|
|
|
;;; Here's the taxonomy for the DELETE/ASSOC/MEMBER functions.
|
|
;;; (I don't actually think these are the world's most important
|
|
;;; functions -- the procedural FILTER/REMOVE/FIND/FIND-TAIL variants
|
|
;;; are far more general.)
|
|
;;;
|
|
;;; Function Action
|
|
;;; ---------------------------------------------------------------------------
|
|
;;; remove pred lis Delete by general predicate
|
|
;;; delete x lis [=] Delete by element comparison
|
|
;;;
|
|
;;; find pred lis Search by general predicate
|
|
;;; find-tail pred lis Search by general predicate
|
|
;;; member x lis [=] Search by element comparison
|
|
;;;
|
|
;;; assoc key lis [=] Search alist by key comparison
|
|
;;; alist-delete key alist [=] Alist-delete by key comparison
|
|
|
|
(define (delete x lis . maybe-=)
|
|
(let ((= (:optional maybe-= equal?)))
|
|
(filter (lambda (y) (not (= x y))) lis)))
|
|
|
|
(define (delete! x lis . maybe-=)
|
|
(let ((= (:optional maybe-= equal?)))
|
|
(filter! (lambda (y) (not (= x y))) lis)))
|
|
|
|
;;; Extended from R4RS to take an optional comparison argument.
|
|
(define (member x lis . maybe-=)
|
|
(let ((= (:optional maybe-= equal?)))
|
|
(find-tail (lambda (y) (= x y)) lis)))
|
|
|
|
;;; R4RS, hence we don't bother to define.
|
|
;;; The MEMBER and then FIND-TAIL call should definitely
|
|
;;; be inlined for MEMQ & MEMV.
|
|
;(define (memq x lis) (member x lis eq?))
|
|
;(define (memv x lis) (member x lis eqv?))
|
|
|
|
|
|
;;; right-duplicate deletion
|
|
;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
|
|
;;; delete-duplicates delete-duplicates!
|
|
;;;
|
|
;;; Beware -- these are N^2 algorithms. To efficiently remove duplicates
|
|
;;; in long lists, sort the list to bring duplicates together, then use a
|
|
;;; linear-time algorithm to kill the dups. Or use an algorithm based on
|
|
;;; element-marking. The former gives you O(n lg n), the latter is linear.
|
|
|
|
(define (delete-duplicates lis . maybe-=)
|
|
(let ((elt= (:optional maybe-= equal?)))
|
|
(check-arg procedure? elt= delete-duplicates)
|
|
(let recur ((lis lis))
|
|
(if (null-list? lis) lis
|
|
(let* ((x (car lis))
|
|
(tail (cdr lis))
|
|
(new-tail (recur (delete x tail elt=))))
|
|
(if (eq? tail new-tail) lis (cons x new-tail)))))))
|
|
|
|
(define (delete-duplicates! lis . maybe-=)
|
|
(let ((elt= (:optional maybe-= equal?)))
|
|
(check-arg procedure? elt= delete-duplicates!)
|
|
(let recur ((lis lis))
|
|
(if (null-list? lis) lis
|
|
(let* ((x (car lis))
|
|
(tail (cdr lis))
|
|
(new-tail (recur (delete! x tail elt=))))
|
|
(if (eq? tail new-tail) lis (cons x new-tail)))))))
|
|
|
|
|
|
;;; alist stuff
|
|
;;;;;;;;;;;;;;;
|
|
|
|
;;; Extended from R4RS to take an optional comparison argument.
|
|
(define (assoc x lis . maybe-=)
|
|
(let ((= (:optional maybe-= equal?)))
|
|
(find (lambda (entry) (= x (car entry))) lis)))
|
|
|
|
(define (alist-cons key datum alist) (cons (cons key datum) alist))
|
|
|
|
(define (alist-copy alist)
|
|
(map (lambda (elt) (cons (car elt) (cdr elt)))
|
|
alist))
|
|
|
|
(define (alist-delete key alist . maybe-=)
|
|
(let ((= (:optional maybe-= equal?)))
|
|
(filter (lambda (elt) (not (= key (car elt)))) alist)))
|
|
|
|
(define (alist-delete! key alist . maybe-=)
|
|
(let ((= (:optional maybe-= equal?)))
|
|
(filter! (lambda (elt) (not (= key (car elt)))) alist)))
|
|
|
|
|
|
;;; find find-tail take-while drop-while span break any every list-index
|
|
;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
|
|
|
|
(define (find pred list)
|
|
(cond ((find-tail pred list) => car)
|
|
(else #f)))
|
|
|
|
(define (find-tail pred list)
|
|
(check-arg procedure? pred find-tail)
|
|
(let lp ((list list))
|
|
(and (not (null-list? list))
|
|
(if (pred (car list)) list
|
|
(lp (cdr list))))))
|
|
|
|
(define (take-while pred lis)
|
|
(check-arg procedure? pred take-while)
|
|
(let recur ((lis lis))
|
|
(if (null-list? lis) '()
|
|
(let ((x (car lis)))
|
|
(if (pred x)
|
|
(cons x (recur (cdr lis)))
|
|
'())))))
|
|
|
|
(define (drop-while pred lis)
|
|
(check-arg procedure? pred drop-while)
|
|
(let lp ((lis lis))
|
|
(if (null-list? lis) '()
|
|
(if (pred (car lis))
|
|
(lp (cdr lis))
|
|
lis))))
|
|
|
|
(define (take-while! pred lis)
|
|
(check-arg procedure? pred take-while!)
|
|
(if (or (null-list? lis) (not (pred (car lis)))) '()
|
|
(begin (let lp ((prev lis) (rest (cdr lis)))
|
|
(if (pair? rest)
|
|
(let ((x (car rest)))
|
|
(if (pred x) (lp rest (cdr rest))
|
|
(set-cdr! prev '())))))
|
|
lis)))
|
|
|
|
(define (span pred lis)
|
|
(check-arg procedure? pred span)
|
|
(let recur ((lis lis))
|
|
(if (null-list? lis) (values '() '())
|
|
(let ((x (car lis)))
|
|
(if (pred x)
|
|
(receive (prefix suffix) (recur (cdr lis))
|
|
(values (cons x prefix) suffix))
|
|
(values '() lis))))))
|
|
|
|
(define (span! pred lis)
|
|
(check-arg procedure? pred span!)
|
|
(if (or (null-list? lis) (not (pred (car lis)))) (values '() lis)
|
|
(let ((suffix (let lp ((prev lis) (rest (cdr lis)))
|
|
(if (null-list? rest) rest
|
|
(let ((x (car rest)))
|
|
(if (pred x) (lp rest (cdr rest))
|
|
(begin (set-cdr! prev '())
|
|
rest)))))))
|
|
(values lis suffix))))
|
|
|
|
|
|
(define (break pred lis) (span (lambda (x) (not (pred x))) lis))
|
|
(define (break! pred lis) (span! (lambda (x) (not (pred x))) lis))
|
|
|
|
(define (any pred lis1 . lists)
|
|
(check-arg procedure? pred any)
|
|
(if (pair? lists)
|
|
|
|
;; N-ary case
|
|
(receive (heads tails) (%cars+cdrs (cons lis1 lists))
|
|
(and (pair? heads)
|
|
(let lp ((heads heads) (tails tails))
|
|
(receive (next-heads next-tails) (%cars+cdrs tails)
|
|
(if (pair? next-heads)
|
|
(or (apply pred heads) (lp next-heads next-tails))
|
|
(apply pred heads)))))) ; Last PRED app is tail call.
|
|
|
|
;; Fast path
|
|
(and (not (null-list? lis1))
|
|
(let lp ((head (car lis1)) (tail (cdr lis1)))
|
|
(if (null-list? tail)
|
|
(pred head) ; Last PRED app is tail call.
|
|
(or (pred head) (lp (car tail) (cdr tail))))))))
|
|
|
|
|
|
;(define (every pred list) ; Simple definition.
|
|
; (let lp ((list list)) ; Doesn't return the last PRED value.
|
|
; (or (not (pair? list))
|
|
; (and (pred (car list))
|
|
; (lp (cdr list))))))
|
|
|
|
(define (every pred lis1 . lists)
|
|
(check-arg procedure? pred every)
|
|
(if (pair? lists)
|
|
|
|
;; N-ary case
|
|
(receive (heads tails) (%cars+cdrs (cons lis1 lists))
|
|
(or (not (pair? heads))
|
|
(let lp ((heads heads) (tails tails))
|
|
(receive (next-heads next-tails) (%cars+cdrs tails)
|
|
(if (pair? next-heads)
|
|
(and (apply pred heads) (lp next-heads next-tails))
|
|
(apply pred heads)))))) ; Last PRED app is tail call.
|
|
|
|
;; Fast path
|
|
(or (null-list? lis1)
|
|
(let lp ((head (car lis1)) (tail (cdr lis1)))
|
|
(if (null-list? tail)
|
|
(pred head) ; Last PRED app is tail call.
|
|
(and (pred head) (lp (car tail) (cdr tail))))))))
|
|
|
|
(define (list-index pred lis1 . lists)
|
|
(check-arg procedure? pred list-index)
|
|
(if (pair? lists)
|
|
|
|
;; N-ary case
|
|
(let lp ((lists (cons lis1 lists)) (n 0))
|
|
(receive (heads tails) (%cars+cdrs lists)
|
|
(and (pair? heads)
|
|
(if (apply pred heads) n
|
|
(lp tails (+ n 1))))))
|
|
|
|
;; Fast path
|
|
(let lp ((lis lis1) (n 0))
|
|
(and (not (null-list? lis))
|
|
(if (pred (car lis)) n (lp (cdr lis) (+ n 1)))))))
|
|
|
|
;;; Reverse
|
|
;;;;;;;;;;;
|
|
|
|
;R4RS, so not defined here.
|
|
;(define (reverse lis) (fold cons '() lis))
|
|
|
|
;(define (reverse! lis)
|
|
; (pair-fold (lambda (pair tail) (set-cdr! pair tail) pair) '() lis))
|
|
|
|
(define (reverse! lis)
|
|
(let lp ((lis lis) (ans '()))
|
|
(if (null-list? lis) ans
|
|
(let ((tail (cdr lis)))
|
|
(set-cdr! lis ans)
|
|
(lp tail lis)))))
|
|
|
|
;;; Lists-as-sets
|
|
;;;;;;;;;;;;;;;;;
|
|
|
|
;;; This is carefully tuned code; do not modify casually.
|
|
;;; - It is careful to share storage when possible;
|
|
;;; - Side-effecting code tries not to perform redundant writes.
|
|
;;; - It tries to avoid linear-time scans in special cases where constant-time
|
|
;;; computations can be performed.
|
|
;;; - It relies on similar properties from the other list-lib procs it calls.
|
|
;;; For example, it uses the fact that the implementations of MEMBER and
|
|
;;; FILTER in this source code share longest common tails between args
|
|
;;; and results to get structure sharing in the lset procedures.
|
|
|
|
(define (%lset2<= = lis1 lis2) (every (lambda (x) (member x lis2 =)) lis1))
|
|
|
|
(define (lset<= = . lists)
|
|
(check-arg procedure? = lset<=)
|
|
(or (not (pair? lists)) ; 0-ary case
|
|
(let lp ((s1 (car lists)) (rest (cdr lists)))
|
|
(or (not (pair? rest))
|
|
(let ((s2 (car rest)) (rest (cdr rest)))
|
|
(and (or (eq? s2 s1) ; Fast path
|
|
(%lset2<= = s1 s2)) ; Real test
|
|
(lp s2 rest)))))))
|
|
|
|
(define (lset= = . lists)
|
|
(check-arg procedure? = lset=)
|
|
(or (not (pair? lists)) ; 0-ary case
|
|
(let lp ((s1 (car lists)) (rest (cdr lists)))
|
|
(or (not (pair? rest))
|
|
(let ((s2 (car rest))
|
|
(rest (cdr rest)))
|
|
(and (or (eq? s1 s2) ; Fast path
|
|
(and (%lset2<= = s1 s2) (%lset2<= = s2 s1))) ; Real test
|
|
(lp s2 rest)))))))
|
|
|
|
|
|
(define (lset-adjoin = lis . elts)
|
|
(check-arg procedure? = lset-adjoin)
|
|
(fold (lambda (elt ans) (if (member elt ans =) ans (cons elt ans)))
|
|
lis elts))
|
|
|
|
|
|
(define (lset-union = . lists)
|
|
(check-arg procedure? = lset-union)
|
|
(reduce (lambda (lis ans) ; Compute ANS + LIS.
|
|
(cond ((null? lis) ans) ; Don't copy any lists
|
|
((null? ans) lis) ; if we don't have to.
|
|
((eq? lis ans) ans)
|
|
(else
|
|
(fold (lambda (elt ans) (if (any (lambda (x) (= x elt)) ans)
|
|
ans
|
|
(cons elt ans)))
|
|
ans lis))))
|
|
'() lists))
|
|
|
|
(define (lset-union! = . lists)
|
|
(check-arg procedure? = lset-union!)
|
|
(reduce (lambda (lis ans) ; Splice new elts of LIS onto the front of ANS.
|
|
(cond ((null? lis) ans) ; Don't copy any lists
|
|
((null? ans) lis) ; if we don't have to.
|
|
((eq? lis ans) ans)
|
|
(else
|
|
(pair-fold (lambda (pair ans)
|
|
(let ((elt (car pair)))
|
|
(if (any (lambda (x) (= x elt)) ans)
|
|
ans
|
|
(begin (set-cdr! pair ans) pair))))
|
|
ans lis))))
|
|
'() lists))
|
|
|
|
|
|
(define (lset-intersection = lis1 . lists)
|
|
(check-arg procedure? = lset-intersection)
|
|
(let ((lists (delete lis1 lists eq?))) ; Throw out any LIS1 vals.
|
|
(cond ((any null-list? lists) '()) ; Short cut
|
|
((null? lists) lis1) ; Short cut
|
|
(else (filter (lambda (x)
|
|
(every (lambda (lis) (member x lis =)) lists))
|
|
lis1)))))
|
|
|
|
(define (lset-intersection! = lis1 . lists)
|
|
(check-arg procedure? = lset-intersection!)
|
|
(let ((lists (delete lis1 lists eq?))) ; Throw out any LIS1 vals.
|
|
(cond ((any null-list? lists) '()) ; Short cut
|
|
((null? lists) lis1) ; Short cut
|
|
(else (filter! (lambda (x)
|
|
(every (lambda (lis) (member x lis =)) lists))
|
|
lis1)))))
|
|
|
|
|
|
(define (lset-difference = lis1 . lists)
|
|
(check-arg procedure? = lset-difference)
|
|
(let ((lists (filter pair? lists))) ; Throw out empty lists.
|
|
(cond ((null? lists) lis1) ; Short cut
|
|
((memq lis1 lists) '()) ; Short cut
|
|
(else (filter (lambda (x)
|
|
(every (lambda (lis) (not (member x lis =)))
|
|
lists))
|
|
lis1)))))
|
|
|
|
(define (lset-difference! = lis1 . lists)
|
|
(check-arg procedure? = lset-difference!)
|
|
(let ((lists (filter pair? lists))) ; Throw out empty lists.
|
|
(cond ((null? lists) lis1) ; Short cut
|
|
((memq lis1 lists) '()) ; Short cut
|
|
(else (filter! (lambda (x)
|
|
(every (lambda (lis) (not (member x lis =)))
|
|
lists))
|
|
lis1)))))
|
|
|
|
|
|
(define (lset-xor = . lists)
|
|
(check-arg procedure? = lset-xor)
|
|
(reduce (lambda (b a) ; Compute A xor B:
|
|
;; Note that this code relies on the constant-time
|
|
;; short-cuts provided by LSET-DIFF+INTERSECTION,
|
|
;; LSET-DIFFERENCE & APPEND to provide constant-time short
|
|
;; cuts for the cases A = (), B = (), and A eq? B. It takes
|
|
;; a careful case analysis to see it, but it's carefully
|
|
;; built in.
|
|
|
|
;; Compute a-b and a^b, then compute b-(a^b) and
|
|
;; cons it onto the front of a-b.
|
|
(receive (a-b a-int-b) (lset-diff+intersection = a b)
|
|
(cond ((null? a-b) (lset-difference = b a))
|
|
((null? a-int-b) (append b a))
|
|
(else (fold (lambda (xb ans)
|
|
(if (member xb a-int-b =) ans (cons xb ans)))
|
|
a-b
|
|
b)))))
|
|
'() lists))
|
|
|
|
|
|
(define (lset-xor! = . lists)
|
|
(check-arg procedure? = lset-xor!)
|
|
(reduce (lambda (b a) ; Compute A xor B:
|
|
;; Note that this code relies on the constant-time
|
|
;; short-cuts provided by LSET-DIFF+INTERSECTION,
|
|
;; LSET-DIFFERENCE & APPEND to provide constant-time short
|
|
;; cuts for the cases A = (), B = (), and A eq? B. It takes
|
|
;; a careful case analysis to see it, but it's carefully
|
|
;; built in.
|
|
|
|
;; Compute a-b and a^b, then compute b-(a^b) and
|
|
;; cons it onto the front of a-b.
|
|
(receive (a-b a-int-b) (lset-diff+intersection! = a b)
|
|
(cond ((null? a-b) (lset-difference! = b a))
|
|
((null? a-int-b) (append! b a))
|
|
(else (pair-fold (lambda (b-pair ans)
|
|
(if (member (car b-pair) a-int-b =) ans
|
|
(begin (set-cdr! b-pair ans) b-pair)))
|
|
a-b
|
|
b)))))
|
|
'() lists))
|
|
|
|
|
|
(define (lset-diff+intersection = lis1 . lists)
|
|
(check-arg procedure? = lset-diff+intersection)
|
|
(cond ((every null-list? lists) (values lis1 '())) ; Short cut
|
|
((memq lis1 lists) (values '() lis1)) ; Short cut
|
|
(else (partition (lambda (elt)
|
|
(not (any (lambda (lis) (member elt lis =))
|
|
lists)))
|
|
lis1))))
|
|
|
|
(define (lset-diff+intersection! = lis1 . lists)
|
|
(check-arg procedure? = lset-diff+intersection!)
|
|
(cond ((every null-list? lists) (values lis1 '())) ; Short cut
|
|
((memq lis1 lists) (values '() lis1)) ; Short cut
|
|
(else (partition! (lambda (elt)
|
|
(not (any (lambda (lis) (member elt lis =))
|
|
lists)))
|
|
lis1))))
|