145 lines
3.6 KiB
Scheme
145 lines
3.6 KiB
Scheme
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; Copyright (c) 1993-1999 by Richard Kelsey and Jonathan Rees. See file COPYING.
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; LU Decomposition (a rewriting of a Pascal program from `Numerical Recipes
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; in Pascal'; look there for a detailed description of what is going on).
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; A is an NxN matrix that is updated in place.
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; This returns a row permutation vector and the sign of that vector.
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(define *lu-decomposition-epsilon* 1.0e-20)
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(define (lu-decomposition a)
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(let* ((n (car (array-shape a)))
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(indx (make-vector n))
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(sign 1.0)
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(vv (make-vector n)))
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(do ((i 0 (+ i 1)))
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((>= i n))
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(do ((j 0 (+ j 1))
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(big 0.0 (max big (abs (array-ref a i j)))))
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((>= j n)
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(if (= big 0.0)
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(error "lu-decomposition matrix has a zero row" a i))
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(vector-set! vv i (/ big)))))
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(do ((j 0 (+ j 1)))
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((>= j n))
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(let ()
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(define (sum-elts i end)
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(do ((k 0 (+ k 1))
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(sum (array-ref a i j)
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(- sum (* (array-ref a i k)
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(array-ref a k j)))))
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((>= k end)
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sum)))
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(do ((i 0 (+ i 1)))
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((>= i j))
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(array-set! a (sum-elts i i) i j))
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(receive (big imax)
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(let loop ((i j) (big 0.0) (imax 0))
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(if (>= i n)
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(values big imax)
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(let ((sum (sum-elts i j)))
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(array-set! a sum i j)
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(let ((temp (* (vector-ref vv i) (abs sum))))
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(if (>= temp big)
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(loop (+ i 1) temp i)
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(loop (+ i 1) big imax))))))
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(if (not (= j imax))
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(begin
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(do ((k 0 (+ k 1)))
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((>= k n))
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(let ((temp (array-ref a imax k)))
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(array-set! a (array-ref a j k) imax k)
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(array-set! a temp j k)))
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(set! sign (- sign))
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(vector-set! vv imax (vector-ref vv j))))
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(vector-set! indx j imax)
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(if (= (array-ref a j j) 0.0)
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(array-set! a *lu-decomposition-epsilon* j j))
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(if (not (= j (- n 1)))
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(let ((temp (/ (array-ref a j j))))
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(do ((i (+ j 1) (+ i 1)))
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((>= i n))
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(array-set! a (* (array-ref a i j) temp) i j)))))))
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(values indx sign)))
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(define (lu-back-substitute a indx b)
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(let ((n (car (array-shape a))))
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(let loop ((i 0) (ii #f))
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(if (< i n)
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(let* ((ip (vector-ref indx i))
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(temp (vector-ref b ip)))
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(vector-set! b ip (vector-ref b i))
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(let ((new (if ii
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(do ((j ii (+ j 1))
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(sum temp (- sum (* (array-ref a i j)
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(vector-ref b j)))))
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((>= j i)
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sum))
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temp)))
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(vector-set! b i new)
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(loop (+ i 1)
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(if (or ii (= temp 0.0)) ii i))))))
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(do ((i (- n 1) (- i 1)))
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((< i 0))
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(do ((j (+ i 1) (+ j 1))
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(sum (vector-ref b i) (- sum (* (array-ref a i j)
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(vector-ref b j)))))
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((>= j n)
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(vector-set! b i (/ sum (array-ref a i i))))))))
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;(define m
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; (array '(4 4)
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; 1.0 2.0 3.0 -2.0
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; 8.0 -6.0 6.0 1.0
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; 3.0 -2.0 0.0 -7.0
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; 4.0 7.0 2.0 -1.0))
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;
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;(define b '#(2.0 1.0 3.0 -2.0))
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;
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;(define (test m b)
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; (let* ((a (copy-array m))
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; (n (car (array-shape m)))
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; (x (make-vector n)))
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;
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; (do ((i 0 (+ i 1)))
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; ((>= i n))
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; (vector-set! x i (vector-ref b i)))
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;
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; (display "b = ")
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; (display b)
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; (newline)
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;
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; (call-with-values
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; (lambda ()
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; (lu-decomposition a))
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; (lambda (indx sign)
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; (lu-back-substitute a indx x)
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;
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; (display "x = ")
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; (display x)
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; (newline)
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;
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; (let ((y (make-vector (vector-length b))))
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; (do ((i 0 (+ i 1)))
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; ((>= i n))
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; (do ((j 0 (+ j 1))
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; (t 0.0 (+ t (* (array-ref m i j) (vector-ref x j)))))
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; ((>= j n)
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; (vector-set! y i t))))
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;
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; (display "a * x =")
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; (display y)
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; (newline))))))
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