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version 1.5, 2010/06/16 10:39:08

version 1.6, 2010/06/19 09:43:45

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%comment $OpenXM: OpenXM/src/asir-contrib/packages/doc/nn_ndbf/nn_ndbf.texi,v 1.4 2010/06/16 08:53:03 noro Exp $

%comment $OpenXM: OpenXM/src/asir-contrib/packages/doc/nn_ndbf/nn_ndbf.texi,v 1.5 2010/06/16 10:39:08 noro Exp $

%comment --- おまじない ---

\input ../../../../asir-doc/texinfo

@iftex

Line 90 In this manual we explain about a new b-function packa

in asir-contrib. To use this package one has to load @samp{nn_ndbf.rr}.

@example

[1518] load("nn_ndbf.rr");

[...] load("nn_ndbf.rr");

@end example

\BJP

このパッケージの函数を呼び出すには, 全て @code{ndbf.} を先頭につける.

Line 202 If an option @code{vord=@var{v}} is given, a variable

@end itemize

@example

[1519] load("nn_ndbf.rr");

[...] load("nn_ndbf.rr");

[1602] ndbf.bfunction(x^3-y^2*z^2);

[...] ndbf.bfunction(x^3-y^2*z^2);

-11664*s^7-93312*s^6-316872*s^5-592272*s^4-658233*s^3-435060*s^2

-158375*s-24500

[1603] ndbf.bfunction(x^3-y^2*z^2|op=1);

[...] ndbf.bfunction(x^3-y^2*z^2|op=1);

[-11664*s^7-93312*s^6-316872*s^5-592272*s^4-658233*s^3-435060*s^2

-158375*s-24500,(108*z^3*x*dz^3+756*z^2*x*dz^2+1080*z*x*dz+216*x)*dx^4

...

+(729/8*z^3*dz^5+9477/8*z^2*dz^4+5103/2*z*dz^3+2025/2*dz^2)*dy^2]

[1604] F=256*u1^3-128*u3^2*u1^2+(144*u3*u2^2+16*u3^4)*u1-27*u2^4

[...] F=256*u1^3-128*u3^2*u1^2+(144*u3*u2^2+16*u3^4)*u1-27*u2^4

-4*u3^3*u2^2$

[1605] ndbf.bfunction(F|weight=[u3,2,u2,3,u1,4]);

[...] ndbf.bfunction(F|weight=[u3,2,u2,3,u1,4]);

576*s^6+3456*s^5+8588*s^4+11312*s^3+8329*s^2+3250*s+525

@end example

Line 313 If an option @code{vord=@var{v}} is given, a variable

@example

[1527] load("nn_ndbf.rr");

[...] load("nn_ndbf.rr");

[1610] ndbf.bf_local(y*((x+1)*x^3-y^2),[x,-1,y,0]);

[...] ndbf.bf_local(y*((x+1)*x^3-y^2),[x,-1,y,0]);

[[-s-1,2]]

[1611] ndbf.bf_local(y*((x+1)*x^3-y^2),[x,-1,y,0]|op=1);

[...] ndbf.bf_local(y*((x+1)*x^3-y^2),[x,-1,y,0]|op=1);

[[[-s-1,2]],12*x^3+36*y^2*x-36*y^2,(32*y*x^2+56*y*x)*dx^2

+((-8*x^3-2*x^2+(128*y^2-6)*x+112*y^2)*dy+288*y*x+(-240*s-128)*y)*dx

+(32*y*x^2-6*y*x+128*y^3-9*y)*dy^2+(32*x^2+6*s*x+640*y^2+39*s+30)*dy

Line 399 If an option @code{vord=@var{v}} is given, a variable

@example

[1537] load("nn_ndbf.rr");

[...] load("nn_ndbf.rr");

[1620] F=256*u1^3-128*u3^2*u1^2+(144*u3*u2^2+16*u3^4)*u1-27*u2^4

[...] F=256*u1^3-128*u3^2*u1^2+(144*u3*u2^2+16*u3^4)*u1-27*u2^4

-4*u3^3*u2^2$

[1621] ndbf.bf_strat(F);

[...] ndbf.bf_strat(F);

[[u3^2,-u1,-u2],[-1],[[-s-1,2],[16*s^2+32*s+15,1],[36*s^2+72*s+35,1]]]

[[[u3^2,-u1,-u2],[-1],[[-s-1,2],[16*s^2+32*s+15,1],[36*s^2+72*s+35,1]]],

[[-4*u1+u3^2,-u2],[96*u1^2+40*u3^2*u1-9*u3*u2^2,...],[[-s-1,2]]]

[[-4*u1+u3^2,-u2],[96*u1^2+40*u3^2*u1-9*u3*u2^2,...],[[-s-1,2]]],

[[...],[-u3*u2,u2*u1,...],[[-s-1,1],...]]]

[[-2048*u1^3-...],[-u3*u2,u2*u1,...],[[-s-1,1],...]]],

[[-256*u1^3+128*u3^2*u1^2+...],[...],[[-s-1,1]]]

[[-256*u1^3+128*u3^2*u1^2+...],[...],[[-s-1,1]]],

[[],[-256*u1^3+128*u3^2*u1^2+...],[]]

[[],[-256*u1^3+128*u3^2*u1^2+...],[]]]

@end example

\JP @node ndbf.action_on_gfs,,, b 関数計算

Line 417 If an option @code{vord=@var{v}} is given, a variable

@table @t

@item ndbf.action_on_gfs(@var{op},@var{v},@var{gfs})

\JP :: 微分作用素 @var{op} の @var{gf^(s+1)} への作用を計算する.

\JP :: 微分作用素 @var{op} の @var{gf^(s+a)} への作用を計算する.

\EG :: computes the action of an operatior @var{op} on @var{gf^(s+1)}

\EG :: computes the action of an operatior @var{op} on @var{gf^(s+a)}

@end table

@table @var

Line 429 If an option @code{vord=@var{v}} is given, a variable

\JP 微分作用素

\EG a differential operator

@item gfs

\JP @var{[g,f,s-a]} なるリスト

\JP @var{[g,f,s+a]} なるリスト

\EG a list @var{[g,f,s-a]}

\EG a list @var{[g,f,s+a]}

@item v

\JP @var{f} の変数のリスト

\JP @var{f} の変数のリスト (@var{v=[v1,...,vn]})

\EG list of variables of @var{f}

\EG list of variables of @var{f} (@var{v=[v1,...,vn]})

@end table

\BJP

@itemize @bullet

@item 微分作用素 @var{op} を @var{gf^(s+1)} に作用させた結果を計算する.

@item 微分作用素 @var{op} を @var{gf^(s+a)} に作用させた結果を計算する.

@item @var{g} および @var{h} は @var{v} を変数とする多項式である.

@item @var{g} は @var{v1,...,vn} を変数とする多項式である.

@item @var{op} は @var{[v1,...,vn,dv1,...,dvn]} を変数とする多項式で表現する.

@item 入力リスト @var{[g,f,s+1]} は @var{gf^(s+1)} を表す.

@item 入力リスト @var{[g,f,s+a]} は @var{gf^(s+a)} を表す.

@item 結果は @var{[h,f,s-a]} なるリストで, @var{hf^(s-a)} を

@item 結果は @var{[h,f,s+c]} なるリストで, @var{hf^(s+b)} を

意味する. ここで @var{a} は整数で, @var{op} が

意味する. ここで @var{c} は整数である.

b-関数を与える作用素なら, @var{a} は 0 となり, @var{h} は b-関数となる.

@var{op} が b-関数 @var{b(s)} を与える作用素なら,

@var{a=1} に対し @var{c=0} で, @var{h=b(s)} (global case) または

@var{h=d(v)b(s)} (local case) である.

@end itemize

\BEG

@itemize @bullet

@item This function computes the action of a differential operator

@var{op} on @var{gf^(s+1)}.

@var{op} on @var{gf^(s+a)}.

@item @var{g} and @var{h} are polynomials with variables @var{v}=@var{v1,\ldots,vn}.

@item @var{g} is a polynomial with variables @var{v1,...,vn}.

@item @var{op} is represented by a polynonmial with @var{[v1,...,vn,dv1,...,dvn]}.

@item The input list @var{[g,f,s+1]} represents @var{gf^(s+1)}.

@item The input list @var{[g,f,s+a]} represents @var{gf^(s+a)}.

@item The result is a list @var{[h,f,s-a]} and it means @var{hf^(s-a)},

@item The result is a list @var{[h,f,s+c]} and it means @var{hf^(s+c)},

where @var{a} is an integer. If @var{op} is an operator giving b-function,

where @var{c} is an integer. If @var{op} is an operator giving b-function

then @var{a}=0 and @var{h} is a b-functio n.

@var{b(s)},

then @var{c=0} for @var{a=1} and @var{h=b(s)} (global case)

or @var{h=b(s)d(v)} (local case).

@end itemize

@example

[...] load("nn_ndbf.rr");

[...] F=x^5-y^2*z^2$

[...] B=ndbf.bfunction(F|op=1)$

[...] ndbf.action_on_gfs(B[1],[x,y,z],[1,F,s+1]);

[-62500000000*s^13-...-2985505717194*s-245434132944,x^5-z^2*y^2,s]

[...] L=ndbf.bf_local(F,[x,0,y,0,z,1]|op=1)$

[...] ndbf.action_on_gfs(L[2],[x,y,z],[1,F,s+1]);

[(-100000*s^5-500000*s^4-990000*s^3-970000*s^2-470090*s-90090)*z^2,

x^5-z^2*y^2,s]

@end example

\JP @node Annihilator イデアル計算,,, 新 b 関数パッケージ nn_ndbf.rr

Line 527 This option is useful when @var{f} is weighted homogen

Line 539 This option is useful when @var{f} is weighted homogen

@example

[1542] load("nn_ndbf.rr");

[...] load("nn_ndbf.rr");

[1625] ndbf.ann(x*y*z*(x^3-y^2*z^2));

[...] ndbf.ann(x*y*z*(x^3-y^2*z^2));

[(-x^4*dy^2+3*z^4*x*dz^2+12*z^3*x*dz+6*z^2*x)*dx+4*z*x^3*dz*dy^2

-z^5*dz^3-6*z^4*dz^2-6*z^3*dz,

(x^4*dy-3*z^3*y*x*dz-6*z^2*y*x)*dx-4*z*x^3*dz*dy+z^4*y*dz^2+3*z^3*y*dz,

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