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1 ;;; -*- Mode: Lisp; Package: Maxima; Syntax: Common-Lisp; Base: 10 -*- ;;;;
2 ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
3 ;;; The data in this file contains enhancements. ;;;;;
4 ;;; ;;;;;
5 ;;; Copyright (c) 1984,1987 by William Schelter,University of Texas ;;;;;
6 ;;; All rights reserved ;;;;;
7 ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
8 ;;; (c) Copyright 1980 Massachusetts Institute of Technology ;;;
9 ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
15 ;;*********************************************************************
16 ;;**************** ******************
17 ;;**************** Macsyma Special Function Routines ******************
18 ;;**************** ******************
19 ;;*********************************************************************
27 ;; subtitle polylogarithm routines
40 ;; li[s](a) = zeta(s) if s > 1 and if a = 1. We
41 ;; simplify this only if s is a rational number and a
42 ;; is the integer 1.
55 ;; li[s](-1) = (2^(1-s)-1)*zeta(s)
63 ;; li[s](1) -> zeta(s)
69 ;; li[s](-1) = (2^(1-s)-1)*zeta(s)
78 expr))))
80 ;; Expand the Polylogarithm li[s](z) for a negative integer parameter s.
98 ;; When arg is a float or rational, use the original li2numer
99 ;; using Spences function.
102 ;; For complex args that should should result in float
103 ;; answers, use bigfloat::li2numer.
125 ;; exponent in first term of taylor expansion of $li is one
130 ;; taylor expansion of $li is its definition:
131 ;; x + x^2/2^s + x^3/3^s + ...
140 nil))
149 ;; computes first pw terms of asymptotic expansion of $li[s](z)
150 ;;
151 ;; pw should be < (1/2)*s or gamma term is undefined
152 ;;
153 ;; Wood, D.C. (June 1992). The Computation of Polylogarithms. Technical Report 15-92
154 ;; University of Kent Computing Laboratory.
155 ;; http://www.cs.kent.ac.uk/pubs/1992/110
156 ;; equation 11.1
170 ;; Numerical evaluation for Chebyschev expansions of the first kind
184 ;; These should really be calculated with minimax rational approximations.
185 ;; Someone has done LI[2] already, and this should be updated; I haven't
186 ;; seen any results for LI[3] yet.
189 ;; Spence's function can be used to compute li[2] for 0 <= x <= 1.
190 ;; To compute the rest, we need the following identities:
191 ;;
192 ;; li[2](x) = -li[2](1/x)-log(-x)^2/2-%pi^2/6
193 ;; li[2](x) = li[2](1/(1-x)) + log(1-x)*log((1-x)/x^2)/2 - %pi^2/6
194 ;;
195 ;; The first tells us how to compute li[2] for x > 1. The result is complex.
196 ;; For x < 0, the second can be used, and the result is real.
197 ;;
198 ;; (See http://functions.wolfram.com/ZetaFunctionsandPolylogarithms/PolyLog2/17/01/01/)
209 ;; li[2](x) = -li[2](1/x)-log(-x)^2/2-%pi^2/6
217 4.68636196e-3 1.0016275e-3 2.32002196e-4
218 5.68178227e-5 1.44963006e-5 3.81632946e-6
219 1.02990426e-6 2.83575385e-7 7.9387055e-8
225 1.21177214e-3 2.07227685e-4 3.99695869e-5
226 8.38064066e-6 1.86848945e-6 4.36660867e-7
227 1.05917334e-7 2.6478920e-8 6.787e-9
232 2.44241560e-2 6.22512464e-3 1.64078831e-3
233 4.44079203e-4 1.22774942e-4 3.45398128e-5
234 9.85869565e-6 2.84856995e-6 8.31708473e-7
235 2.45039499e-7 7.2764962e-8 2.1758023e-8 6.546158e-9
249 ;; subtitle polygamma routines
251 ;; gross efficiency hack, exp is a function of *k*, *k* should be mbind'ed
255 0
270 ;; Integral of psi function psi[n](x)
273 nil
292 ;; This gets pretty hairy now.
360 ;; Gauss's Formula
364 q))))))))
401 ;; subtitle polygamma tayloring routines
403 ;; These routines are specially coded to be as fast as possible given the
404 ;; current $TAYLOR; too bad they have to be so ugly.
468 () ))))
513 ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
514 ;;; Lambert W function
515 ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
516 ;;
517 ;; References
518 ;;
519 ;; Corless, R. M., Gonnet, D. E. G., Jeffrey, D. J., Knuth, D. E. (1996).
520 ;; "On the Lambert W function". Advances in Computational Mathematics 5:
521 ;; pp 329-359
522 ;;
523 ;; http://www.apmaths.uwo.ca/~djeffrey/Offprints/W-adv-cm.pdf.
524 ;; or http://www.apmaths.uwo.ca/~rcorless/frames/PAPERS/LambertW/
525 ;;
526 ;; D. J. Jeffrey, D. E. G. Hare, R. M. Corless
527 ;; Unwinding the branches of the Lambert W function
528 ;; The Mathematical Scientist, 21, pp 1-7, (1996)
529 ;; http://www.apmaths.uwo.ca/~djeffrey/Offprints/wbranch.pdf
530 ;;
531 ;; Winitzki, S. Uniform Approximations for Transcendental Functions.
532 ;; In Part 1 of Computational Science and its Applications - ICCSA 2003,
533 ;; Lecture Notes in Computer Science, Vol. 2667, Springer-Verlag,
534 ;; Berlin, 2003, 780-789. DOI 10.1007/3-540-44839-X_82
535 ;; http://homepages.physik.uni-muenchen.de/~Winitzki/papers/
536 ;;
537 ;; Darko Verebic,
538 ;; Having Fun with Lambert W(x) Function
539 ;; arXiv:1003.1628v1, March 2010, http://arxiv.org/abs/1003.1628
540 ;;
541 ;; See also http://en.wikipedia.org/wiki/Lambert's_W_function
546 ;;; Set properties to give full support to the parser and display
552 ;;; lambert_w is a simplifying function
555 ;;; Derivative of lambert_w
561 grad)
563 ;;; Integral of lambert_w
564 ;;; integrate(W(x),x) := x*(W(x)^2-W(x)+1)/W(x)
568 x
574 integral)
584 ;; W(%e) = 1
587 ;; W(-log(2)/2) = -log(2)
590 ;; W(-1/e) = -1
593 ;; W(-%pi/2) = %i*%pi/2
595 ;; numerical evaluation
597 ;; x may be an integer. eg "lambert_w(1),numer;"
605 ;; An approximation of the k-branch of generalized Lambert W function
606 ;; k integer
607 ;; z real or complex lisp float
608 ;; Used as initial guess for Halley's iteration.
609 ;; When W(z) is real, ensure that guess is real.
615 ; For principal branch k=0, use expression by Winitzki
617 ; For k=1 branch, near branch point z=-1/%e with im(z) < 0
622 ; For k=-1 branch, z real with -1/%e < z < 0
623 ; W(z) is real in this range
626 ; For k=-1 branch, near branch point z=-1/%e with im(z) >= 0
631 ; Default to asymptotic expansion Corless et al (4.20)
632 ; W_k(z) = log(z) + 2.pi.i.k - log(log(z)+2.pi.i.k)
635 two-pi-i-k
638 ;; Complex value of the principal branch of Lambert's W function in
639 ;; the entire complex plane with relative error less than 1%, given
640 ;; standard branch cuts for sqrt(z) and log(z).
641 ;; Winitzki (2003)
645 ; w = (2*log(1+B*y)-log(1+C*log(1+D*y))+E)/(1+1/(2*log(1+B*y)+2*A)
646 (/
649 e)
653 ;; Approximate k=-1 branch of Lambert's W function over -1/e < z < 0.
654 ;; W(z) is real, so we ensure the starting guess for Halley iteration
655 ;; is also real.
656 ;; Verebic (2010)
663 ;; In the region where W(z) is real
664 ;; -1/e < z < C, use power series about branch point -1/e ~ -0.36787
665 ;; C = -0.3 seems a reasonable crossover point
668 ;; otherwise C <= z < 0, use iteration W(z) ~ ln(-z)-ln(-W(z))
669 ;; nine iterations are sufficient over -0.3 <= z < 0
676 ;; Approximate Lambert W(k,z) for k=1 and k=-1 near branch point z=-1/%e
677 ;; using power series in y=-sqrt(2*%e*z+2)
678 ;; for im(z) < 0, approximates k=1 branch
679 ;; for im(z) >= 0, approximates k=-1 branch
680 ;;
681 ;; Corless et al (1996) (4.22)
682 ;; Verebic (2010)
683 ;;
684 ;; z is a real or complex bigfloat:
690 ;; Algorithm based in part on Corless et al (1996).
691 ;;
692 ;; It is Halley's iteration applied to w*exp(w).
693 ;;
694 ;;
695 ;; w[j] exp(w[j]) - z
696 ;; w[j+1] = w[j] - -------------------------------------------------
697 ;; (w[j]+2)(w[j] exp(w[j]) -z)
698 ;; exp(w[j])(w[j]+1) - ---------------------------
699 ;; 2 w[j] + 2
700 ;;
701 ;; The algorithm has cubic convergence. Once convergence begins, the
702 ;; number of digits correct at step k is roughly 3 times the number
703 ;; which were correct at step k-1.
704 ;;
705 ;; Convergence can stall using convergence test abs(w[j+1]-w[j]) < prec,
706 ;; as happens for generalized_lambert_w(-1,z) near branch point z = -1/%e
707 ;; Therefore also stop iterating if abs(w[j]*exp(w[j]) - z) << abs(z)
718 ;; Check iteration converged to correct branch
720 w))
732 "Approximate generalized_lambert_w(k,z) for bigfloat: z as initial guess"
735 ;; if k=-1, z very close to -1/%e and imag(z)>=0, use power series
741 ;; if k=1, z very close to -1/%e and imag(z)<0, use power series
746 ;; Initialize using float value if z is representable as a float
752 ;; For large z, use Corless et al (4.20)
753 ;; W_k(z) ~ log(z) + 2.pi.i.k - log(log(z)+2.pi.i.k)
763 ;; Check Lambert W iteration converged to the correct branch
764 ;; W_k(z) + ln W_k(z) = ln z, for k = -1 and z in [-1/e,0)
765 ;; = ln z + 2 pi i k, otherwise
766 ;; See Jeffrey, Hare, Corless (1996), eq (12)
767 ;; k integer
768 ;; z, w bigfloat: numbers
773 ;; k=-1 branch with z and w real.
778 t
779 nil))
781 ; i k = (W_k(z) + ln W_k(z) - ln(z)) / 2 pi
786 t
787 nil))))
788 t
793 ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
794 ;;; Generalized Lambert W function
795 ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;
800 ;;; Set properties to give full support to the parser and display
806 ;;; lambert_w is a simplifying function
809 ;;; Derivative of lambert_w
812 nil
816 grad)
818 ;;; Integral of lambert_w
819 ;;; integrate(W(k,x),x) := x*(W(k,x)^2-W(k,x)+1)/W(k,x)
822 nil
824 x
830 integral)
838 ;; Numerical evaluation for real or complex x
840 ;; x may be an integer. eg "generalized_lambert_w(0,1),numer;"
844 ;; Numerical evaluation for real or complex bigfloat x
854 ;; When x is on or near the unit circle the other
855 ;; approaches don't work. Use the expansion in powers of
856 ;; log(z) (from cephes cpolylog)
857 ;;
858 ;; li[s](z) = sum(Z(s-j)*(log(z))^j/j!, j = 0, inf)
859 ;;
860 ;; where Z(j) = zeta(j) for j != 1. For j = 1:
861 ;;
862 ;; Z(1) = -log(-log(z)) + sum(1/k, k, 1, s - 1)
863 ;;
864 ;;
865 ;; This is similar to
866 ;; http://functions.wolfram.com/10.08.06.0024.01, but that
867 ;; identity is clearly undefined if v is a positive
868 ;; integer because zeta(1) is undefined.
869 ;;
870 ;; Thus,
871 ;;
872 ;; li[3](z) = Z(3) + Z(2)*log(z) + Z(1)*log(z)^2/2!
873 ;; + Z(0)*log(z)^3/3! + sum(Z(-k)*log(z)^(k+4)/(k+4)!,k,1,inf);
874 ;;
875 ;; But Z(-k) = zeta(-k) is 0 if k is even. So
876 ;;
877 ;; li[3](z) = Z(3) + Z(2)*log(z) + Z(1)*log(z)^2/2!
878 ;; + Z(0)*log(z)^3/3! + sum(Z(-(2*k+1))*log(z)^(2*k+4)/(2*k+4)!,k,0,inf);
882 (+ sum
898 ;;(format t "~3d: ~A / ~A = ~A~%" k top bot term)
900 sum)))
904 ;; If |x| < series-threshold, the series is used.
911 ;; li[3](-1) = -(1-2^(1-3))*li[3](1)
912 ;; = -3/4*zeta(3)
913 ;;
914 ;; From the formula
915 ;;
916 ;; li[s](-1) = (2^(1-s)-1)*zeta(s)
917 ;;
918 ;; (See http://functions.wolfram.com/10.08.03.0003.01)
921 ;; For z not in the interval (0, 1) and for integral n, we
922 ;; have the identity:
923 ;;
924 ;; li[n](z) = -log(-z)^n/n! + (-1)^(n-1)*li[n](1/z)
925 ;; + 2 * sum(li[2*r](-1)/(n-2*r)!*log(-z)^(n-2*r), r, 1, floor(n/2))
926 ;;
927 ;; (See http://functions.wolfram.com/ZetaFunctionsandPolylogarithms/PolyLog/17/02/01/01/0008/)
928 ;;
929 ;; In particular for n = 3:
930 ;;
931 ;; li[3](z) = li[3](1/z) - log(-z)/6*(log(-z)^2+%pi^2)
937 result))
940 ;; For real x, li-using-power-of-log can return a complex
941 ;; number with a tiny imaginary part. Get rid of that
942 ;; when x is real.
945 result)))
946 ;; Don't use the identity below because the identity seems
947 ;; to be incorrect. For example, for x = -0.862 it returns
948 ;; a complex value with an imaginary part that is not close
949 ;; to zero as expected.
950 #+nil
952 ;; The series converges too slowly so use the identity:
953 ;;
954 ;; li[3](-x/(1-x)) + li[3](1-x) + li[3](x)
955 ;; = li[3](1) + %pi^2/6*log(1-x) - 1/2*log(x)*(log(1-x))^2 + 1/6*(log(1-x))^3
956 ;;
957 ;; Or
958 ;;
959 ;; li[3](x) = li[3](1) + %pi^2/6*log(1-x) - 1/2*log(x)*(log(1-x))^2 + 1/6*(log(1-x))^3
960 ;; - li[3](-x/(1-x)) - li[3](1-x)
961 ;;
962 ;; (See http://functions.wolfram.com/10.08.17.0048.01)
973 ;; Sum the power series. threshold determines when the
974 ;; summation has converted.
988 ;; The series threshold to above sqrt(1/2) because li[2](%i) needs
989 ;; the value of li[2](1/2-%i/2), and the magnitude of the argument
990 ;; is sqrt(1/2) = 0.707. If the threshold is below this, we get
991 ;; into an infinite recursion oscillating between the two args.
996 ;; %pi^2/6. This follows from the series.
999 ;; -%pi^2/12. From the formula
1000 ;;
1001 ;; li[s](-1) = (2^(1-s)-1)*zeta(s)
1002 ;;
1003 ;; (See http://functions.wolfram.com/10.08.03.0003.01)
1006 ;; Use
1007 ;; li[2](z) = -li[2](1/z) - 1/2*log(-z)^2 - %pi^2/6,
1008 ;;
1009 ;; valid for all z not in the intervale (0, 1).
1010 ;;
1011 ;; (See http://functions.wolfram.com/10.08.17.0013.01)
1015 ;; this converges faster when close to unit circle
1018 ;; no longer in use
1019 ;;(> (abs z) series-threshold)
1020 ;; For 0.5 <= |z|, where the series would not converge very quickly, use
1021 ;;
1022 ;; li[2](z) = li[2](1/(1-z)) + 1/2*log(1-z)^2 - log(-z)*log(1-z) - %pi^2/6
1023 ;;
1024 ;; (See http://functions.wolfram.com/10.08.17.0016.01)
1025 ;;(let* ((1-z (- 1 z))
1026 ;; (ln (log 1-z)))
1027 ;; (+ (li2numer (/ 1-z))
1028 ;; (* 0.5 ln ln)
1029 ;; (- (* (log (- z))
1030 ;; ln))
1031 ;; (- (/ (expt (%pi z) 2) 6)))))
1033 ;; Series evaluation:
1034 ;;
1035 ;; li[2](z) = sum(z^k/k^2, k, 1, inf);
1042 sum)))))))
1045 ;; Series evaluation:
1046 ;;
1047 ;; li[s](z) = sum(z^k/k^s, k, 1, inf);
1053 ;; Return the value and the number of terms used, for
1054 ;; debugging and for helping in determining the series
1055 ;; threshold.
1059 ;; When x is on or near the unit circle the other
1060 ;; approaches don't work. Use the expansion in powers of
1061 ;; log(z) (from cephes cpolylog)
1062 ;;
1063 ;; li[s](z) = sum(Z(s-j)*(log(z))^j/j!, j = 0, inf)
1064 ;;
1065 ;; where Z(j) = zeta(j) for j != 1. For j = 1:
1066 ;;
1067 ;; Z(1) = -log(-log(z)) + sum(1/k, k, 1, s - 1)
1069 ;; Compute Z(j)
1072 (+ sum
1083 ;; Compute sum(Z(s-j)*log(z)^j/j!, j = 1, s)
1097 s sum top bot))
1098 ;; Compute the sum for j = s+1 and up. But since
1099 ;; zeta(-k) is 0 for k even, we only every other term.
1105 ;; Return the result and the number of terms used for
1106 ;; helping in determining the series threshold and the
1107 ;; log-series threshold.
1108 ;;
1109 ;; Note that if z is real and less than 0, li[s](z) is
1110 ;; real. The series can return a tiny complex value in
1111 ;; this case, so we want to clear that out before
1112 ;; returning the answer.
1115 sum)
1116 k))
1124 ;; For z not in the interval (0, 1) and for integral n, we
1125 ;; have the identity:
1126 ;;
1127 ;; li[n](z) = -log(-z)^n/n! + (-1)^(n-1)*li[n](1/z)
1128 ;; + 2 * sum(li[2*r](-1)/(n-2*r)!*log(-z)^(n-2*r), r, 1, floor(n/2))
1129 ;;
1130 ;; (See http://functions.wolfram.com/ZetaFunctionsandPolylogarithms/PolyLog/17/02/01/01/0008/)
1131 ;;
1132 ;; Or
1133 ;;
1134 ;; li[n](z) = -log(-z)^n/n! + (-1)^(n-1)*li[n](1/z)
1135 ;; + 2 * sum(li[2*m-2*r](-1)/(n-2*m+2*r)!*log(-z)^(n-2*m+2*r), r, 0, m - 1)
1136 ;;
1137 ;; where m = floor(n/2). Thus, n-2*m = 0 if n is even and 1 if n is odd.
1138 ;;
1139 ;; For n = 2*m, we have
1140 ;;
1141 ;; li[2*m](z) = -log(-z)^(2*m)/(2*m)! - li[2*m](1/z)
1142 ;; + 2 * sum(li[2*r](-1)/(2*m-2*r)!*log(-z)^(2*m-2*r), r, 1, m)
1143 ;; = -log(-z)^(2*m)/(2*m)! - li[2*m](1/z)
1144 ;; + 2 * sum((li[2*m-2*r](-1)*log(-z)^(2*r+1))/(2*r+1)!,r,0,m-1);
1145 ;;
1146 ;; For n = 2*m+1, we have
1147 ;;
1148 ;; li[2*m+1](z) = -log(-z)^(2*m+1)/(2*m+1)! + li[2*m+1](1/z)
1149 ;; + 2 * sum(li[2*r](-1)/(2*m-2*r + 1)!*log(-z)^(2*m-2*r + 1), r, 1, m)
1150 ;; = -log(-z)^(2*m+1)/(2*m+1)! + li[2*m+1](1/z)
1151 ;; + 2 * sum((li[2*m-2*r](-1)*log(-z)^(2*r+1))/(2*r+1)!,r,0,m-1);
1152 ;; Thus,
1153 ;;
1154 ;; li[n](z) = -log(-z)^n/n! + (-1)^(n-1)*li[n](1/z)
1155 ;; + 2 * sum((li[2*m-2*r](-1)*log(-z)^(2*r+1))/(2*r+1)!,r,0,floor(n/2)-1);