196 lines
5.6 KiB
Scheme
196 lines
5.6 KiB
Scheme
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; Copyright (c) 1993-1999 by Richard Kelsey. See file COPYING.
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; Code to determine the separation vertices of a graph
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; NODES is a list of nodes
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; (TO node) returns a list of the nodes which are connected to this one
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; (SLOT-NODE node) and (SET-SLOT! node value) are used by the algorithm to
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; associate data with nodes (in the absence of a tables).
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(define (separation-vertices nodes to slot set-slot!)
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(cond ((null? nodes)
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(values '() '()))
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((null? (cdr nodes))
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(values nodes (list nodes)))
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(else
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(receive (separators components)
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(real-separation-vertices (make-vertices nodes to slot set-slot!))
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(for-each (lambda (n) (set-slot! n #f)) nodes)
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(values separators components)))))
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(define-record-type vertex :vertex
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(really-make-vertex data edges dfs-index)
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vertex?
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(data vertex-data) ; user's data
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(edges vertex-edges ; list of edges from this vertex
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set-vertex-edges!)
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(dfs-index vertex-dfs-index ; ordering from depth-first-search
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set-vertex-dfs-index!)
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(level vertex-level ; value used in algorithm...
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set-vertex-level!)
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(parent vertex-parent ; parent of this node in DFS tree
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set-vertex-parent!))
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(define (make-vertex data)
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(really-make-vertex data '() 0))
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(define-record-type edge :edge
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(make-edge from to unused?)
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(from edge-from) ; two (unordered) vertices
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(to edge-to)
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(unused? edge-unused ; used to mark edges that have been traversed
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set-edge-unused!))
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(define (make-edge from to)
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(really-make-edge from to #t))
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(define (other-vertex edge v)
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(if (eq? v (edge-from edge))
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(edge-to edge)
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(edge-from edge)))
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(define (maybe-add-edge from to)
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(if (and (not (eq? from to))
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(not (any? (lambda (e)
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(or (eq? to (edge-from e))
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(eq? to (edge-to e))))
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(vertex-edges from))))
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(let ((e (make-edge from to)))
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(set-vertex-edges! from (cons e (vertex-edges from)))
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(set-vertex-edges! to (cons e (vertex-edges to))))))
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(define (make-vertices nodes to slot set-slot!)
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(let ((vertices (map (lambda (n)
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(let ((v (make-vertex n)))
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(set-slot! n v)
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v))
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nodes)))
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(for-each (lambda (n)
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(for-each (lambda (n0)
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(maybe-add-edge (slot n) (slot n0)))
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(to n)))
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nodes)
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vertices))
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; The numbers are the algorithm step numbers from page 62 of Graph Algorithms,
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; Shimon Even, Computer Science Press, 1979.
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; Them Us
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; L(v) (vertex-level v)
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; k(v) (vertex-dfs-index v)
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; f(v) (vertex-parent v)
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; S stack
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; s start
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(define (real-separation-vertices vertices)
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(do-vertex (car vertices) 0 '() (car vertices) '() '()))
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; 2
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(define (do-vertex v i stack start v-res c-res)
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(let ((i (+ i 1)))
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(set-vertex-level! v i)
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(set-vertex-dfs-index! v i)
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(find-unused-edge v i (cons v stack) start v-res c-res)))
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; 3
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(define (find-unused-edge v i stack start v-res c-res)
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(let ((e (first edge-unused? (vertex-edges v))))
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(if e
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(do-edge e v i stack start v-res c-res)
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(no-unused-edge v i stack start v-res c-res))))
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; 4
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(define (do-edge e v i stack start v-res c-res)
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(let ((u (other-vertex e v)))
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(set-edge-unused?! e #f)
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(cond ((= 0 (vertex-dfs-index u))
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(set-vertex-parent! u v)
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(do-vertex u i stack start v-res c-res))
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(else
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(if (> (vertex-level v)
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(vertex-dfs-index u))
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(set-vertex-level! v (vertex-dfs-index u)))
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(find-unused-edge v i stack start v-res c-res)))))
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; 5
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(define (no-unused-edge v i stack start v-res c-res)
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(let* ((parent (vertex-parent v))
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(p-dfs-index (vertex-dfs-index parent)))
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(cond ((= 1 p-dfs-index)
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(gather-nonseparable-with-start v i stack start v-res c-res))
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((< (vertex-level v) p-dfs-index)
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(if (< (vertex-level v)
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(vertex-level parent))
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(set-vertex-level! parent (vertex-level v)))
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(find-unused-edge parent i stack start v-res c-res))
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(else
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(gather-nonseparable v i stack start v-res c-res)))))
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; 7
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(define (gather-nonseparable v i stack start v-res c-res)
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(let* ((parent (vertex-parent v))
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(data (vertex-data parent)))
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(receive (vertices stack)
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(pop-down-to stack v)
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(find-unused-edge parent
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i
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stack
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start
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(if (not (memq? data v-res))
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(cons data v-res)
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v-res)
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(cons (cons data (map vertex-data vertices)) c-res)))))
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; 9
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(define (gather-nonseparable-with-start v i stack start v-res c-res)
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(receive (vertices stack)
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(pop-down-to stack v)
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(let* ((data (vertex-data start))
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(c-res (cons (cons data (map vertex-data vertices)) c-res)))
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(if (not (any? edge-unused? (vertex-edges start)))
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(values v-res c-res)
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(find-unused-edge start
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i
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stack
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start
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(if (not (memq? data v-res))
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(cons data v-res)
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v-res)
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c-res)))))
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(define (pop-down-to stack v)
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(do ((stack stack (cdr stack))
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(res '() (cons (car stack) res)))
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((eq? v (car stack))
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(values (cons v res) (cdr stack)))))
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(define (test-separation-vertices graph)
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(let ((nodes (map (lambda (n)
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(vector (car n) #f #f))
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graph)))
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(for-each (lambda (data node)
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(vector-set! node 1 (map (lambda (s)
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(first (lambda (v)
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(eq? s (vector-ref v 0)))
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nodes))
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(cdr data))))
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graph
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nodes)
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(receive (separation-vertices components)
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(separation-vertices nodes
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(lambda (v) (vector-ref v 1))
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(lambda (v) (vector-ref v 2))
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(lambda (v val) (vector-set! v 2 val)))
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(values (map (lambda (v) (vector-ref v 0)) separation-vertices)
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(map (lambda (l)
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(map (lambda (v) (vector-ref v 0))
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l))
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components)))))
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