version 1.15, 2004/03/05 15:56:40 |
version 1.17, 2004/05/14 01:25:03 |
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/*$OpenXM: OpenXM/src/asir-contrib/packages/doc/sm1.oxweave,v 1.14 2004/03/05 15:30:50 ohara Exp $ */ |
/*$OpenXM: OpenXM/src/asir-contrib/packages/doc/sm1.oxweave,v 1.16 2004/03/05 19:05:11 ohara Exp $ */ |
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/*&C |
/*&C |
@c DO NOT EDIT THIS FILE oxphc.texi |
@c DO NOT EDIT THIS FILE oxphc.texi |
Line 1679 F_D(a,b1,b2,...,bn,c;x1,...,xn) |
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Line 1679 F_D(a,b1,b2,...,bn,c;x1,...,xn) |
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where @var{a} =(a,c,b1,...,bn). |
where @var{a} =(a,c,b1,...,bn). |
When n=2, the Lauricella function is called the Appell function F_1. |
When n=2, the Lauricella function is called the Appell function F_1. |
The parameters a, c, b1, ..., bn may be rational numbers. |
The parameters a, c, b1, ..., bn may be rational numbers. |
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@item It does not call sm1 function appell1. As a concequence, |
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when parameters are rational or symbolic, this function also works |
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as well as integral parameters. |
@end itemize |
@end itemize |
*/ |
*/ |
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Line 1706 F_D(a,b1,b2,...,bn,c;x1,...,xn) |
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Line 1709 F_D(a,b1,b2,...,bn,c;x1,...,xn) |
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$B$N$_$?$9HyJ,J}Dx<07O$rLa$9(B. $B$3$3$G(B, |
$B$N$_$?$9HyJ,J}Dx<07O$rLa$9(B. $B$3$3$G(B, |
@var{a} =(a,c,b1,...,bn). |
@var{a} =(a,c,b1,...,bn). |
$B%Q%i%a!<%?$OM-M}?t$G$b$h$$(B. |
$B%Q%i%a!<%?$OM-M}?t$G$b$h$$(B. |
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@item sm1 $B$N4X?t(B appell1 $B$r$h$V$o$1$G$J$$$N$G(B, $B%Q%i%a!<%?$,M-M}?t$dJ8;z<0$N>l9g$b(B |
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$B@5$7$/F0$/(B. |
@end itemize |
@end itemize |
*/ |
*/ |
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Line 1728 F_D(a,b1,b2,...,bn,c;x1,...,xn) |
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Line 1733 F_D(a,b1,b2,...,bn,c;x1,...,xn) |
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[x1*dx1*dx2,-x1^2*dx1^2,-x2^2*dx1*dx2,-x1*x2^2*dx2^2]] |
[x1*dx1*dx2,-x1^2*dx1^2,-x2^2*dx1*dx2,-x1*x2^2*dx2^2]] |
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[283] sm1.rank(sm1.appell1([1/2,3,5,-1/3])); |
[283] sm1.rank(sm1.appell1([1/2,3,5,-1/3])); |
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[285] Mu=2$ Beta = 1/3$ |
[285] Mu=2$ Beta = 1/3$ |
[287] sm1.rank(sm1.appell1([Mu+Beta,Mu+1,Beta,Beta,Beta])); |
[287] sm1.rank(sm1.appell1([Mu+Beta,Mu+1,Beta,Beta,Beta])); |
Line 1763 F_4(a,b,c1,c2,...,cn;x1,...,xn) |
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Line 1768 F_4(a,b,c1,c2,...,cn;x1,...,xn) |
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where @var{a} =(a,b,c1,...,cn). |
where @var{a} =(a,b,c1,...,cn). |
When n=2, the Lauricella function is called the Appell function F_4. |
When n=2, the Lauricella function is called the Appell function F_4. |
The parameters a, b, c1, ..., cn may be rational numbers. |
The parameters a, b, c1, ..., cn may be rational numbers. |
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@item @item It does not call sm1 function appell4. As a concequence, |
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when parameters are rational or symbolic, this function also works |
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as well as integral parameters. |
@end itemize |
@end itemize |
*/ |
*/ |
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Line 1790 F_C(a,b,c1,c2,...,cn;x1,...,xn) |
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Line 1798 F_C(a,b,c1,c2,...,cn;x1,...,xn) |
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$B$N$_$?$9HyJ,J}Dx<07O$rLa$9(B. $B$3$3$G(B, |
$B$N$_$?$9HyJ,J}Dx<07O$rLa$9(B. $B$3$3$G(B, |
@var{a} =(a,b,c1,...,cn). |
@var{a} =(a,b,c1,...,cn). |
$B%Q%i%a!<%?$OM-M}?t$G$b$h$$(B. |
$B%Q%i%a!<%?$OM-M}?t$G$b$h$$(B. |
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@item sm1 $B$N4X?t(B appell1 $B$r$h$V$o$1$G$J$$$N$G(B, $B%Q%i%a!<%?$,M-M}?t$dJ8;z<0$N>l9g$b(B |
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$B@5$7$/F0$/(B. |
@end itemize |
@end itemize |
*/ |
*/ |
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Line 2069 Slope $B$N@dBPCM$rLa$9(B. |
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Line 2079 Slope $B$N@dBPCM$rLa$9(B. |
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/*&en |
/*&en |
@include sm1-auto-en.texi |
@include sm1-auto.en |
*/ |
*/ |
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/*&ja |
/*&ja |
@include sm1-auto-ja.texi |
@include sm1-auto.ja |
*/ |
*/ |
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