| /dports/math/giacxcas/giac-1.6.0/doc/fr/ |
| H A D | gosper.cas | 1 //gosper(-2-2*i,2-2*i,2)ou gosper(-2-2*i,2-2*i,3)
2 gosper(x,y,n):={
11 gosper(x,a,n-1);
12 gosper(b,a,n-1);
13 gosper(c,b,n-1);
14 gosper(c,d,n-1);
15 gosper(d,g,n-1);
16 gosper(g,f,n-1);
17 gosper(y,f,n-1);
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| H A D | Makefile.am | 22 …exag*.* logoxas.* dragon.* sphinx*.* bouquet.* arbre*.* fleur.* sapin*.* gosper*.* hilbert*.* poly…
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| H A D | Makefile.in | 330 sphinx*.* bouquet.* arbre*.* fleur.* sapin*.* gosper*.* \
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| H A D | casgeo.tex | 7692 //gosper(-2-2*i,2-2*i,2)ou gosper(-2-2*i,2-2*i,3)
7693 gosper(x,y,n):={
7703 L:=L,gosper(x,a,n-1);
7704 L:=L,gosper(b,a,n-1);
7705 L:=L,gosper(c,b,n-1);
7706 L:=L,gosper(c,d,n-1);
7707 L:=L,gosper(d,g,n-1);
7708 L:=L,gosper(g,f,n-1);
7709 L:=L,gosper(y,f,n-1);
7713 {\tt gosper(-2-2*i,2-2*i,3)}\\
[all …]
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| /dports/math/reduce/Reduce-svn5758-src/packages/sum/ |
| H A D | zeilberg.tst | 13 gosper(k,k);
14 gosper(k^2,k);
15 gosper(k^3,k);
16 gosper(k^4,k);
17 gosper(k^5,k);
18 % gosper(k^20,k);
21 gosper(x*k,k);
22 gosper(k*x^k,k);
24 gosper(1/(k^2-1),k);
55 gosper(k*n^k,k);
[all …]
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| H A D | zeilberg.rlg | 15 gosper(k,k);
22 gosper(k^2,k);
29 gosper(k^3,k);
37 gosper(k^4,k);
45 gosper(k^5,k);
53 % gosper(k^20,k);
63 gosper(x*k,k);
70 gosper(k*x^k,k);
84 gosper(1/(k^2-1),k);
222 gosper(k*n^k,k);
[all …]
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| H A D | zeilberg.tex | 162 {\tt gosper(a,k,m,n)} determines
216 4: gosper(binomial(k,n),k);
243 6: gosper(1/k,k);
281 10: gosper(ff(k-1)/gg(k),k);
314 {\tt extended\verb+_+gosper(a,k,m)}
983 49: gosper(pochhammer(k-n,n),k);
1128 56: gosper(k*factorial(k),k);
1136 58: gosper(
1174 {\tt gosper(factorial(k),k)}.
1180 {\tt gosper(factorial(k/2),k)}.
[all …]
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| H A D | sum.red | 67 else if !*zeilberg then gosper!*(mk!*sq u,y)
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| H A D | zeilberg.red | 120 symbolic procedure gosper!*(u,v);
121 % gosper(f,k) searches for a hypergeometric term that is a closed form
124 % gosper(f,k,m,n) determines
147 symbolic procedure gosper!-eval u;
148 <<argnochk('gosper . u) where !*argnochk := t;
149 prepsq!* gosper!*(car u,cdr u)>>;
151 put('gosper,number!-of!-args,2);
153 put ('gosper,'psopfn,'gosper!-eval);
156 % gosperborders(func,k,k0,k1) = gosper(func,k,k0,k1)
182 % gosper1(func,k) = gosper(func,k)
[all …]
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| /dports/math/reduce/Reduce-svn5758-src/xmpl/ |
| H A D | zeilberg.tst | 13 gosper(k,k);
14 gosper(k^2,k);
15 gosper(k^3,k);
16 gosper(k^4,k);
17 gosper(k^5,k);
18 % gosper(k^20,k);
21 gosper(x*k,k);
22 gosper(k*x^k,k);
24 gosper(1/(k^2-1),k);
55 gosper(k*n^k,k);
[all …]
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| H A D | zeilberg.rlg | 15 gosper(k,k);
22 gosper(k^2,k);
29 gosper(k^3,k);
37 gosper(k^4,k);
45 gosper(k^5,k);
53 % gosper(k^20,k);
63 gosper(x*k,k);
70 gosper(k*x^k,k);
84 gosper(1/(k^2-1),k);
222 gosper(k*n^k,k);
[all …]
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| /dports/math/giacxcas/giac-1.6.0/examples/recur/ |
| H A D | autres.cxx | 54 gosper(x,y,n):={
64 gosper(x,a,n-1);
65 gosper(b,a,n-1);
66 gosper(c,b,n-1);
67 gosper(c,d,n-1);
68 gosper(d,g,n-1);
69 gosper(g,f,n-1);
70 gosper(y,f,n-1);
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| /dports/math/py-Diofant/Diofant-0.13.0/docs/modules/ |
| H A D | concrete.rst | 101 .. autofunction:: diofant.concrete.gosper.gosper_normal
103 .. autofunction:: diofant.concrete.gosper.gosper_term
105 .. autofunction:: diofant.concrete.gosper.gosper_sum
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| /dports/math/py-sympy/sympy-1.9/doc/src/modules/ |
| H A D | concrete.rst | 101 .. autofunction:: sympy.concrete.gosper.gosper_normal
103 .. autofunction:: sympy.concrete.gosper.gosper_term
105 .. autofunction:: sympy.concrete.gosper.gosper_sum
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| /dports/math/reduce/Reduce-svn5758-src/doc/manual/ |
| H A D | zeilberg.tex | 154 {\tt gosper(a,k)} determines a closed
158 {\tt gosper(a,k,m,n)} determines
212 4: gosper(binomial(k,n),k);
239 6: gosper(1/k,k);
277 10: gosper(ff(k-1)/gg(k),k);
959 49: gosper(pochhammer(k-n,n),k);
1109 56: gosper(k*factorial(k),k);
1117 58: gosper(
1155 {\tt gosper(factorial(k),k)}.
1161 {\tt gosper(factorial(k/2),k)}.
[all …]
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| /dports/math/reduce/Reduce-svn5758-src/doc/manual2/ |
| H A D | zeilberg.tex | 28 The {\tt gosper}\ttindex{gosper} operator is an implementation of the
32 {\tt gosper(a,k)} determines a closed form antidifference. If it does
36 {\tt gosper(a,k,m,n)} determines
47 gosper((-1)^(k+1)*(4*k+1)*factorial(2*k)/
56 gosper(binomial(k,n),k);
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| /dports/math/py-Diofant/Diofant-0.13.0/diofant/tests/concrete/ |
| H A D | test_gosper.py | 8 from diofant.concrete.gosper import gosper_sum
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| /dports/math/giacxcas/giac-1.6.0/src/ |
| H A D | intg.h | 90 …bool gosper(const polynome & P,const polynome & Q,const polynome & R,polynome & Y,gen & deno,GIAC_…
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| /dports/math/py-sympy/sympy-1.9/sympy/concrete/tests/ |
| H A D | test_gosper.py | 6 from sympy.concrete.gosper import gosper_normal, gosper_sum, gosper_term
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| /dports/math/giacxcas/giac-1.6.0/examples/ |
| H A D | Makefile.am | 275 tortue/gosper.cxx \
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| H A D | Makefile.in | 576 tortue/gosper.cxx \
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| /dports/math/py-Diofant/Diofant-0.13.0/diofant/concrete/ |
| H A D | summations.py | 8 from .gosper import gosper_sum
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| /dports/math/py-sympy/sympy-1.9/sympy/concrete/ |
| H A D | summations.py | 5 from sympy.concrete.gosper import gosper_sum
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| /dports/editors/neovim/neovim-0.6.1/runtime/syntax/ |
| H A D | maple.vim | 528 syn keyword mvPkg_sumtools Sumtohyper gosper hypersum simpcomb
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| /dports/editors/vim/vim-8.2.3745/runtime/syntax/ |
| H A D | maple.vim | 528 syn keyword mvPkg_sumtools Sumtohyper gosper hypersum simpcomb
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