Annotation of OpenXM/doc/Papers/bfct.tex, Revision 1.1
1.1 ! noro 1: % $OpenXM$
! 2: \documentclass{jarticle}
! 3: \usepackage[theorem,useeps,FVerb]{jssac}
! 4: \title{Risa/Asir �$B$K$*$1$k�(B Weyl Algebra �$B>e$N%0%l%V%J4pDl7W;;$*$h$S$=$N1~MQ�(B}
! 5: \author{�$BLnO$�(B �$B@59T�(B\affil{�$B?@8MBg3X�(B}\mail{noro@math.kobe-u.ac.jp}}
! 6: \art{�$BO@J8�(B}
! 7:
! 8: \begin{document}
! 9: \maketitle
! 10:
! 11: \section{Weyl Algebra}
! 12:
! 13: \subsection{Leibnitz rule}
! 14:
! 15: �$BBN�(B $K$ �$B>e$N�(B $n$ �$B<!85�(B Weyl Algebra
! 16: $$D_n = K\langle x_1,\cdots,x_n,\partial_1,\cdots,\partial_n \rangle$$
! 17: �$B$K$*$1$k@Q$N7W;;$O�(B, �$B$h$/CN$i$l$F$$$k$h$&$K�(B Leibnitz rule �$B$G7W;;$G$-$k�(B.
! 18: �$B$9$J$o$A�(B, $2n$ �$BJQ?tB?9`<04D�(B
! 19: $K[x,\xi]=K[x_1,\cdots,x_n,\xi_1,\cdots,\xi_n]$ �$B$+$i�(B
! 20: $D_n$ �$B$X$N�(B $K$ �$B@~7A<LA|�(B $\Psi$ �$B$r�(B
! 21: $\Psi(x^\alpha \xi^\beta) = x^\alpha \partial^\beta$
! 22: �$B$GDj5A$9$k$H$-�(B,
! 23: $$\Psi(f)\Psi(g) = \Psi(\sum_{k_1,\ldots,k_n \ge 0} {1 \over {k_1!\cdots k_n!}}
! 24: {{\partial^k f} \over {\partial \xi^k}} {{\partial^k g} \over {\partial x^k}})$$
! 25: ($f,g\in K[x,\xi]$) �$B$H$J$k�(B. Weyl Algebra �$B$K$*$1$k7W;;$N8zN(2=$N$?$a$K$O�(B
! 26: �$B@Q$N8zN(2=$,=EMW$G$"$j�(B, �$B$=$N$?$a$K$O�(B Leibnitz rule �$B$r$I$&;H$&$+$,80$H$J$k�(B.
! 27: �$BFC$K�(B, �$B%0%l%V%J4pDl7W;;$r9M$($k>l9g�(B, monomial $\times$ polynomial �$B$N9bB.�(B
! 28: �$B2=$,I,MW$G$"$k�(B.
! 29:
! 30: \subsection{Asir �$B$K$*$1$k<BAu�(B}
! 31:
! 32: Asir �$B$K$*$1$k=i4|$N<BAu$G$O�(B, �$B$3$l$r�(B
! 33:
! 34: $m$ : monomial, $f= \sum f_j$ ($f_j$ : monomial) �$B$KBP$7�(B
! 35: $mf = \sum mf_j$
! 36:
! 37: �$B$H$7$F7W;;$7$F$$$?�(B. �$B$3$3$G�(B monomial �$B$I$&$7$N@Q$O�(B
! 38: $$x^k D^l\cdot x^a D^b = (x_1^{k_1}(D_1^{l_1}x_1^{a_1})D_1^{b_1})\cdots
! 39: (x_n^{k_n}(D_n^{l_n}x_n^{a_n})D_n^{b_n})$$
! 40: �$B$H$7$F�(B, �$B1&JU$N�(B $D_i^{k_i}x_i^{a_i}$ �$B$r�(B Leibnitz rule �$B$K$h$j�(B
! 41: $$D_i^{l_i}x_i^{a_i} = \sum_{j=0}^{Min(l_i,a_i)}j!{l_i\choose j}
! 42: {a_i\choose j}x_i^{a_i-j}D_i^{l_i-j}$$
! 43: �$B$H$7�(B, �$B$3$l$i$N@Q$r�(B, �$BDL>o$N2D49$JB?9`<0$H$7$FE83+$9$k�(B, �$B$H$$$&J}K!�(B
! 44: �$B$r:N$C$F$$$?�(B. �$B$7$+$7�(B, �$B$3$N�(B monomial �$B$N@Q<+BN$,B?9`<0$H$J$k$?$a�(B,
! 45: �$B$3$l$i$rB-$79g$o$;$k:]$K$K9`$NHf3S$*$h$S%j%9%H$N$D$J$.49$($,B??t�(B
! 46: �$B@8$8�(B, �$BFC$K�(B $f$ �$B$N9`?t$,B?$$>l9g$K8zN($,0-$$$3$H$,J,$+$C$?�(B.
! 47:
! 48: \subsection{�$B2~NI�(B}
! 49:
! 50: Leibnitz rule �$B$K8=$l$kHyJ,$r�(B $f\in K[x,\xi]$�$B$K:nMQ$5$;$F$b�(B monomial
! 51: �$B$N=g=x$OJQ$o$i$J$$$3$H$KCm0U$9$l$P�(B, �$B:8$+$i$+$1$k�(B monomial $m$ �$B$r8GDj�(B
! 52: �$B$7$?$H$-�(B, �$BA09`$N�(B monomial �$B$I$&$7$N@Q$K$*$$$F�(B
! 53:
! 54: \begin{enumerate}
! 55: \item $D_i^{l_i}x_i^{a_i}$ �$B$rJQ7A$7$FF@$i$l$kOB$r>o$K�(B $\sum_{j=0}^{l_i}$
! 56: �$B$H$9$k�(B. $l_i>Min(l_i,a_i)$ �$B$N>l9g�(B, �$B78?t$O�(B 0 �$B$H$7$F$*$/�(B.
! 57:
! 58: \item �$BE,Ev$J=g=x$rDj$a$F�(B, �$B@Q$r9=@.$9$k�(B monomial �$B$r@0Ns$7�(B, �$BBP1~$9$k0LCV$N�(B
! 59: monomial �$B$I$&$7$NOB$r$^$::n$k�(B. �$B$3$l$O4{$K@0Ns$5$l$F$$$k�(B $f_j$ �$B$HF1=g$G$h$$�(B.
! 60:
! 61: \item �$B:G8e$K$=$l$i$rB-$79g$o$;$k�(B.
! 62: \end{enumerate}
! 63: �$BMW$9$k$K�(B, Leibnitz rule �$B$K$*$$$F�(B, �$BHyJ,$K4X$9$kOB$r@h$K7W;;$9$k$H$$$&$3�(B
! 64: �$B$H$@$,�(B, �$B$3$l$G�(B $m$ �$B$N�(B $\partial$ �$B$K4X$9$k<!?t$,$h$[$I9b$/$J$$8B$j8zN(�(B
! 65: �$B2=$9$k�(B. (�$B$3$l$O�(B, Kan/sm1 �$B$G4{$K9T$o$l$F$$$?�(B. ) �$B$5$i$K�(B, �$B<!$N2~NI$,9M$(�(B
! 66: �$B$i$l$k�(B.
! 67:
! 68: \begin{itemize}
! 69: \item
! 70: $(x_1^{k_1}(D_1^{l_1}x_1^{a_1})D_1^{b_1})\cdots
! 71: (x_n^{k_n}(D_n^{l_n}x_n^{a_n})D_n^{b_n})$
! 72: �$B$N�(B �$B7W;;$r�(B incremental �$B$K9T$&�(B.
! 73:
! 74: �$B$3$l$O�(B ${1 \over {k_1!\cdots k_n!}}$ �$B$K8=$l$k6&DL$NItJ,@Q$r=EJ#$7$F7W�(B
! 75: �$B;;$7$J$$$H$$$&$3$H$G$"$j�(B, �$B<!?t$,9b$$>l9g$KM-8z$+$b$7$l$J$$�(B.
! 76:
! 77: \item $l_i, a_i$ �$B$,�(B 0 �$B$N>l9g$N�(B shortcut.
! 78:
! 79: �$B0lHL$K<!?t$,�(B 0 �$B$K$J$kItJ,$,B?$$$G$3$l$O=EMW$G$"$k�(B.
! 80:
! 81: \item exponent vector, monomial �$B$J$I$rI=$99=B$BN$N%a%b%j4IM}$r<+A0$G9T$&�(B.
! 82:
! 83: �$B$3$l$O�(B, Weyl �$B$K8B$i$:�(B, �$BM-8BBN>e$N>l9g$K$O0lHL$KMQ$$$F$$$k�(B. �$B$3$l$b�(B
! 84: �$B8zN($KBg$-$/1F6A$9$k�(B.
! 85: \end{itemize}
! 86: �$B0J>e$N2~NI$r2C$($k$3$H$G�(B, �$B=i4|<BAu$KHf3S$7$F==J,8zN(2=$9$k$3$H$,$G$-$?�(B.
! 87:
! 88: \subsection{Weyl Algebra �$B$K$*$1$k�(B Buchberger �$B%"%k%4%j%:%`�(B}
! 89:
! 90: �$BB?9`<04D>e$N�(B Buchberger �$B%"%k%4%j%:%`<BAu$K$*$$$F$O�(B, �$B<o!9$N�(B criteria �$B$*�(B
! 91: �$B$h$S�(Bselection strategy �$B$,9M0F$5$l<BMQ2=$5$l$F$$$k$,�(B, Weyl Algebra �$B$K$*�(B
! 92: �$B$$$F$b�(BBuchberger's criterion (S-polynomial �$B$r9=@.$9$kB?9`<0$NF,9`$N�(B
! 93: GCD �$B$,�(B 1 �$B$N>l9g$K$O$=$N�(B S-polynomial �$B$O�(B 0 �$B$K@55,2=$5$l$k�(B) �$B0J30$O$=$N$^$^�(B
! 94: �$B;H$($k�(B. �$B$h$C$F�(B, �$B$"$H$O@Q$rA0@a$N$b$N$K49$($l$P�(B, �$BB?9`<04DMQ$N%I%i%$%P�(B,
! 95: �$B%5%V%k!<%A%s$,;H$(�(B, �$BMF0W$K�(B Weyl Algebra �$B>e$N�(B Buchberger �$B%"%k%4%j%:%`$N�(B
! 96: �$B<BAu$,F@$i$l$k�(B.
! 97:
! 98: \section{b-function �$B$N7W;;�(B}
! 99: \label{orig}
! 100:
! 101: \subsection{b-function}
! 102: $D=D_n=K\langle x_1,\cdots,x_n,\partial_1,\cdots,\partial_n\rangle$
! 103: ($\partial_i = \partial/\partial x_i$), $f \in K[x_1,\cdots,x_n]$ �$B$H$9�(B
! 104: �$B$k$H$-�(B$P(s)f^{s+1}=b_f(s)f^s$ �$B$J$k�(B $P(s) \in D[s]$ �$B$,B8:_$9$k$h$&$J:G>.�(B
! 105: �$B<!?t$N�(B $b_f(s) \in K[s]$ �$B$r�(B $f$ �$B$N�(B (global) $b$-function �$B$H8F$V�(B
! 106: \footnote{�$BK\Mh$O�(B $\tilde b(s)$ �$B$H=q$/$Y$-$@$,�(B, �$BK\9F$G$O�(B $b(s)$ �$B$H�(B
! 107: �$B=q$/$3$H$K$9$k�(B.}.
! 108: �$BBg0$5W�(B\cite{oaku-bfct} �$B$K$h$j�(B $b$-function �$B$O0J2<$N$h$&$K7W;;$G$-$k�(B. �$B$^$:�(B,
! 109: $n+1$ �$B<!85$N�(B Weyl Algebra $D_{n+1}=K\langle
! 110: t,x_1,\cdots,x_n,\partial_t,\partial_1,\cdots,\partial_n\rangle$ �$B$r9M�(B
! 111: �$B$($k�(B.
! 112:
! 113: \begin{Def}
! 114: $D_{n+1}$ �$B$N85�(B
! 115: $P = \sum c_{\mu\nu\alpha\beta}t^\mu x^\alpha \partial_t^\nu \partial^\beta$
! 116: �$B$KBP$7�(B, $${\rm ord}_F(P) := \max\{\nu-\mu | �$B$"$k�(B \alpha, \beta �$B$KBP$7�(B
! 117: c_{\mu\nu\alpha\beta} \neq 0 \}$$
! 118: $$\hat{\sigma}(P) :=
! 119: \sum_{\nu-\mu={\rm ord}_F(P)} c_{\mu\nu\alpha\beta}t^\mu x^\alpha \partial_t^\nu \partial^\beta$$
! 120: \end{Def}
! 121:
! 122: \begin{Def}
! 123: ${\rm ord}_F(P) = m$ �$B$J$k�(B $P \in D_{n+1}$ �$B$KBP$7�(B, $\psi(P) \in D[s]$ �$B$r�(B
! 124: $$
! 125: \psi(P)(t\partial_t) =
! 126: \left\{
! 127: \parbox[c]{2in}{
! 128: $\hat{\sigma}(t^mP)$ \quad\quad $(m\ge 0)$\\
! 129: $\hat{\sigma}(\partial_t^{-m}P)$ \quad $(m< 0)$
! 130: }
! 131: \right.
! 132: $$
! 133: �$B$GDj5A$9$k�(B.
! 134: \end{Def}
! 135:
! 136: \begin{Th}
! 137: $$I=Id(t-y_1f,\partial_1+y_1 (\partial f/\partial x_1) \partial_t, \cdots,
! 138: \partial_n+ y_1 (\partial f/\partial x_n) f_n \partial_t)$$
! 139: �$B$KBP$7�(B, $G_1$ �$B$r�(B $I_1 = I \cap D$ �$B$N%0%l%V%J4pDl$H$9$k�(B. �$B$3$N;~�(B,
! 140: $$Id(\psi(G_1)) \cap K[s] = Id(b(-s-1))$$
! 141: \end{Th}
! 142: �$BBg0$5W�(B \cite{oaku-bfct} �$B$G$O�(B
! 143: $$(Id(\psi(G_1)) \cap K[x,s]) \cap K[s]$$�$B$J$kFsCJ3,$N�(B elimination �$B$K$h�(B
! 144: �$B$k7W;;$rDs0F$7$F$$$k�(B. �$B$3$l$O�(B, local �$B$J�(B b-function�$B$N7W;;$K�(B
! 145: $(Id(\psi(G_1)) \cap K[x,s])$ �$B$,I,MW$H$J$k$?$a$H9M$($i$l$k$,�(B, global
! 146: b-function �$B$N$_$r5a$a$k>l9g$K$O�(B, �$BD>@\�(B $K[s]$ �$B$H$N8r$o$j$r5a$a$F9=$o$J�(B
! 147: �$B$$�(B. �$B$h$C$F�(B, �$BG$0U$N=g=x$K4X$9$k�(B $Id(\psi(G_1))$ �$B$N%0%l%V%J4pDl$,5a$^$C$F�(B
! 148: �$B$$$l$P�(B, $b(s)$ �$B$O2D49B?9`<04D$N>l9g$HF1MM$K�(B, �$BL$Dj78?tK!$h$j5a$a$k�(B
! 149: �$B$3$H$,$G$-$k�(B.
! 150:
! 151: \subsection{\Q �$B>e$N�(B Weyl Algebra �$B$K$*$1$k:G>.B?9`<0$N�(B modular �$B7W;;�(B}
! 152: \label{mod1}
! 153:
! 154: $D$ �$B$r�(B $\Q$ �$B>e$N�(B Weyl Algebra, $J \subset D$, $P \in D$ �$B$+$D�(B $P$ �$B$O@0�(B
! 155: �$B?t78?t$H$7�(B, $J\cap \Q[P] \neq \{0\}$ �$B$H$9$k�(B. �$B$3$N;~�(B, $J\cap \Q[P] =
! 156: Id(b(P))$ �$B$H$9$l$P�(B
! 157: $b(s)$ �$B$O�(B$D/J$ �$B$K$*$1$k�(B $P$ �$B$N�(B \Q �$B>e$N:G>.B?9`<0$H$J$k�(B.
! 158: �$B$3$3$G�(B, $b(s) \in \Z[s]$ �$B$+$D�(B \Z �$B>e86;OE*$H<h$l$k�(B.
! 159:
! 160: $J$ �$B$N�(B, �$B=g=x�(B $<$ �$B$K4X$9$k%0%l%V%J4pDl$G�(B, �$B3F85$NF,78?t$,�(B 1 �$B$G$"$k$b$N$r�(B $G$
! 161: �$B$H$7�(B, $G$ �$B$N3F85$N�(B �$B$N78?t$,�(B $\Z_{(p)} = \{a/b | a\in \Z, b \notin
! 162: p\Z\}$ �$B$KB0$9$k$h$&$J�(B $p$�$B$rA*$V�(B. $\phi_p$ �$B$r�(B $\Z_{(p)}$ �$B$+$i�(B $GF(p)$
! 163: �$B$X$NI8=`E*<M1F�(B (�$B$*$h$S$=$N�(B $D$ �$B$X$N3HD%�(B) �$B$H$9$k�(B.
! 164:
! 165: \begin{Lem}
! 166: $\phi_p(G)$ �$B$O�(B $Id(\phi_p(G))$ �$B$N�(B $<$ �$B$K4X$9$k%0%l%V%J4pDl$G�(B, $\phi_p(b(P)) \in
! 167: Id(\phi_p(G))$.
! 168: \end{Lem}
! 169: \begin{Proof}
! 170: $G$ �$B$+$i:n$i$l$k�(B S-polynomial �$B$N�(B $G$ �$B$K$h$k�(B 0 �$B$X$N�(B reduction �$B$,�(B $Z_{(p)}$ �$B>e�(B
! 171: �$B$G9T$($k�(B. �$B$h$C$F�(B, �$B$=$N�(B $\phi_p$ �$B$K$h$kA|$,$=$N$^$^�(B $\phi_p(G)$ �$B$K$h$k�(B
! 172: reduction �$B$K$J$k$+$i�(B, $\phi_p(G)$ �$B$O�(B $Id(\phi_p(G))$ �$B$N%0%l%V%J4pDl$H�(B
! 173: �$B$J$k�(B. �$B8eH>$bF1MM$G$"$k�(B.
! 174: \end{Proof}
! 175:
! 176: �$B2>Dj$K$h$j�(B $\phi_p(b(s))$ �$B$O�(B 0�$B$G$J$$$+$i�(B, $\phi_p(P)$
! 177: �$B$N�(B $\phi_p(D)/Id(\phi_p(G))$ �$B$K$*$1$k:G>.B?9`<0�(B $b_p(s)$ �$B$,B8:_$7$F�(B
! 178: $b_p(s) | \phi_p(b(s))$ �$B$,@.$jN)$D�(B. �$BFC$K�(B $\deg(b_p(s)) \le \deg(b(s))$.
! 179:
! 180: \begin{Th}
! 181: \label{invimg}
! 182: $b_p(s)$ �$B$r�(B $\phi_p(D)/Id(\phi_p(G))$ �$B$K$*$1$k�(B $\phi_p(P)$ �$B$N:G>.B?9`�(B
! 183: �$B<0$H$9$k$H$-�(B, $\deg(f(s)) = \deg(b_p(s))$, $f(P)
! 184: \in Id(G)$�$B$J$k�(B $f \in \Z[s]$ �$B$,B8:_$9$l$P�(B, $f(s) = b(s)$.
! 185: \end{Th}
! 186: \begin{Proof}
! 187: �$B2>Dj$h$j�(B $b(s)|f(s)$. �$B0lJ}$G�(B $\deg(f(s)) = \deg(b_p(s)) \le \deg(b(s))$ �$B$@$+$i�(B
! 188: $b(s)=f(s)$.
! 189: \end{Proof}
! 190:
! 191: \begin{Alg}
! 192: \label{modbfct}
! 193: \begin{tabbing}
! 194: Input: \= �$B9`=g=x�(B $<$, $<$ �$B$K4X$9$k%0%l%V%J4pDl�(B $G \subset D$ (�$BF,78?t$,�(B 1),\\
! 195: \> $Id(G) \cap \Q[P] \neq \{0\}$ �$B$J$k�(B $P\in D$ (�$B@0?t78?t�(B)\\
! 196: Output: $Id(G) \cap \Q[P] = Id(b(P))$ �$B$J$k�(B $b(s) \in \Q[s]$\\
! 197: do \= \{\\
! 198: \> $p \leftarrow G \in \Z_{(p)}$ �$B$J$kL$;HMQ$NAG?t�(B\\
! 199: \> $b_p \leftarrow$ $\phi_p(P)$ �$B$N�(B $\phi_p(D)/Id(\phi_p(G))$ �$B$K$*$1$k:G>.B?9`<0�(B\\
! 200: \> $d \leftarrow deg(b_p)$\\
! 201: \> $c \leftarrow NF(P^d,G)+\sum_{i=0}^{d-1}c_i NF(P^i,G)$ ($c_i$ �$B$OL$Dj78?t�(B)\\
! 202: \> $C \leftarrow \{C_t(c_0,\cdots,c_{d-1})=0 | C_t$ �$B$O�(B $c$ �$B$N3F�(B {\rm monomial} �$B$N78?t�(B\}\\
! 203: \> if \= $C$ �$B$,2r�(B $\{c_0=a_0,\cdots,c_{d-1}=a_{d-1}\}$ �$B$r;}$D�(B \{\\
! 204: \> \> return $s^d+\sum_{i=0}^{d-1}a_is^i$\\
! 205: \> \}\\
! 206: \}
! 207: \end{tabbing}
! 208: \end{Alg}
! 209: �$BK!�(B $p$ �$B$G$N:G>.B?9`<0$O�(B, $NF(\phi_p(P^k),Id(\phi_p(G)))$ �$B$r=g$K7W;;$7$F�(B
! 210: �$B@~7A4X78$rC5$9$3$H$GF@$i$l$k�(B.
! 211: $b(s) \in \Z[s]$ �$B$H$7$?;~$N<g78?t$r3d$i$J$$�(B $p$ �$B$KBP$7$F$ODjM}�(B \ref{invimg}
! 212: �$B$N�(B $f$�$B$OB8:_$9$k$+$i�(B, �$B%"%k%4%j%:%`�(B \ref{modbfct} �$B$ODd;_$9$k�(B. �$B$^$?�(B, $C$ �$B$,�(B
! 213: �$B2r$r;}$D$J$i�(B, �$BK!�(B $p$ �$B$G$N0l0U@-$h$j$=$l$O0l0UE*$K7h$^$k�(B.
! 214: $C$ �$B$N5a2r$O�(B, �$BK!�(B $p$ �$B$G$N0l0U@-$rMxMQ$7$F�(B, Hensel �$B9=@.$K$h$j8zN($h$/5a$a$k�(B
! 215: �$B$3$H$,$G$-$k�(B. �$B>\:Y$O�(B \cite{RUR} �$B$r;2>H�(B.
! 216:
! 217: \subsection{�$B%[%m%N%_%C%/$J�(B ideal �$B$KBP$9$k�(B $b$-function}
! 218: \label{mod2}
! 219:
! 220: ideal $I \subset D_n$,$w \in \R^n \setminus \{0\}$ �$B$KBP$7�(B,
! 221: weight $(-w,w)$ �$B$K4X$9$k�(B initial ideal $in_{(-w,w)}(I)$ �$B$,�(B, Weyl Algebra
! 222: �$B$K$*$1$k%0%l%V%J4pDl7W;;$K$h$j5a$^$k�(B (\cite{SST} Theorem 1.1.6).
! 223: $I$ �$B$N�(B characteristic variety �$B$N<!85$,�(B $n$ �$B$G$"$k�(B
! 224: �$B$H$-�(B $I$ �$B$O%[%m%N%_%C%/$H8F$P$l$k$,�(B, �$B$3$N$H$-�(B \cite{SST} Theorem 5.1.2
! 225: �$B$K$h$j�(B
! 226: $$in_{(-w,w)}(I) \cap K[s] = Id(b(s))$$ ($s =
! 227: w_1\theta_1+\cdots+w_n\theta_n, \theta_i = x_i\partial_i$) �$B$J$k�(B 0 �$B$G$J�(B
! 228: �$B$$B?9`<0�(B $b(s)$ �$B$,B8:_$9$k�(B. �$B$3$N�(B $b(s)$ �$B$r�(B, $I$ �$B$N�(B (global) $b$-function
! 229: �$B$H8F$V�(B.
! 230: �$BFC$K�(B, �$BB?9`<0�(B $f$ �$B$KBP$7�(B,
! 231: $$I_f=Id(t-f,\partial_1+(\partial f/\partial x_1) \partial_t, \cdots,
! 232: \partial_n+ (\partial f/\partial x_n) \partial_t)$$�$B$H$*$/;~�(B, $I_f$
! 233: �$B$O%[%m%N%_%C%/$G�(B, $t$ �$B$r@hF,$NJQ?t$H$9$k;~�(B $I_f$ �$B$N�(B
! 234: $w=(1,0,\cdots,0)$ �$B$K4X$9$k�(B global $b$-function �$B$r�(B $B(s)$�$B$H$9$l$P�(B,
! 235: $b_f(s) = B(-s-1)$ �$B$,@.$jN)$D�(B. �$B$h$C$F�(B, $D/in_{(-w,w)}(I_f)$ �$B$K$*$1$k�(B
! 236: $t\partial_t$ �$B$N:G>.B?9`<0$+$i�(B $b_f(s)$ �$B$r5a$a$k$3$H$b$G$-$k�(B.
! 237: �$B$3$3$G�(B, $in_{(-w,w)}(I_f)$ �$B$N7W;;$K$O�(B non-term order �$B$K$h$k%0%l%V%J4pDl�(B
! 238: �$B7W;;$,I,MW$H$J$k$,�(B, \cite{SST} �$B$G=R$Y$i$l$F$$$k@F<!2=$K$h$j�(B
! 239: �$B$"$k�(B term order �$B$N$b$H$G$N%0%l%V%J4pDl7W;;$K5"Ce$G$-$k�(B.
! 240:
! 241: \subsection{�$B%?%$%_%s%0%G!<%?�(B}
! 242:
! 243: Section \ref{orig} �$B$G>R2p$7$?�(B, �$BFsCJ3,$N>C5n$K$h$kJ}K!�(B (�$BJ}K!�(B 1)�$B$H�(B,
! 244: $Id(\psi(G_1))\cap K[s]$�$B$r�(B Section \ref{mod1} �$B$G=R$Y$?$h$&$K:G>.B?9`<0�(B
! 245: �$B$H$7$F5a$a$kJ}K!�(B (�$BJ}K!�(B 2), �$B$*$h$S�(B Section \ref{mod2} �$B$G=R$Y$?J}K!�(B (�$BJ}�(B
! 246: �$BK!�(B 3)�$B$K$h$k7W;;;~4V$r$5$^$6$^$JB?9`<0$KBP$7$FHf3S$9$k�(B. �$B$$$:$l$b�(B,
! 247: $b$-function �$B$N7W;;$O�(Bmodular �$B7W;;$G:G>.B?9`<05a$a$kJ}K!$K$h$j9T$C�(B
! 248: �$B$?�(B. �$BNcBj$O�(B\cite{oaku-bfct}, \cite{yano-bfct} �$B$+$i:N$C$?�(B. �$B8eH>$N�(B
! 249: $x^a+xy^{b-1}+y^b$ �$B$K4X$7$F$O�(B, �$BK\9V5fO?Cf$NBg0$5W�(B, �$B9b;3N>;a$K$h$k9F$r�(B
! 250: �$B;2>H�(B. �$B7W;;$O�(B, PentiumIII 1GHz �$B>e$G9T$C$?�(B. �$BC10L$OIC$G%,!<%Y%C%8%3%l%/%7%g�(B
! 251: �$B%s;~4V$O=|$$$F$"$k�(B. ``--'' �$B$O�(B, �$BB>$NJ}K!$HHf3S$7$F;~4V$,$+$+$j2a$.$k$?�(B
! 252: �$B$aCfCG$7$?$3$H$r0UL#$9$k�(B. �$BI=�(B 1�$B$G$O7W;;$,Hf3SE*MF0W$J$b$N$,07$o$l$F$*�(B
! 253: �$B$j�(B, �$B3FJ}K!$GBg:9$O$J$$$,�(B, �$BI=�(B 2 �$B$G$O�(B, �$BJ}K!�(B 1 �$B$G$O7W;;$,:$Fq$J$b$N$,�(B, �$BJ}�(B
! 254: �$BK!�(B 2, 3 �$B$K$h$j7W;;$G$-$F$$$k�(B. �$B$^$?�(B, �$B<!?t$,>e$,$k$K$D$l�(B, �$BJ}K!�(B 3�$B$,M%0L$H�(B
! 255: �$B$J$k�(B. �$B$3$l$O�(B, �$BJ}K!�(B 2 �$B$K8=$l$k%0%l%V%J4pDl7W;;$,�(B, �$BJ}K!�(B 3 �$B$K$*$1$k�(B
! 256: $in_{(-w,w)}(I_f)$ �$B$N7W;;$KHf$Y$F:$Fq$H$J$k$?$a$G$"$k�(B. �$B$3$l$OI=�(B 3 �$B$K$*�(B
! 257: �$B$$$F$5$i$K82Cx$H$J$j�(B, �$BJ}K!�(B 2 �$B$G$O7W;;$G$-$J$$Nc$b=P�(B
! 258: �$B$FMh$k�(B. �$B<B:]$K$O�(B, �$BJ}K!�(B 3 �$B$G$O�(B, �$B:G>.B?9`<0$N7W;;$,�(B
! 259: dominant �$B$H$J$kNc$b$7$P$7$P8+$i$l$k�(B.
! 260:
! 261: \begin{table}[hbtp]
! 262: \begin{tabular}{c|c|c|c|c} \hline
! 263: & $\deg(b(s))$ & �$BJ}K!�(B 1 & �$BJ}K!�(B 2 & �$BJ}K!�(B 3 \\ \hline
! 264: $x^5+x^3y^3+y^5$ & 7 &1.4 &2.4 &1.3 \\ \hline
! 265: $x^3+y^3+z^3+x^2y^2z^2+xyz$ & 5 &3.5 &3.9 & 10\\ \hline
! 266: $x^6+y^4+z^3$ &18 &0.4 &0.7 & 0.2 \\ \hline
! 267: $x^4+y^4+z^3+xyz$ &8 &0.3 &0.6 & 0.3\\ \hline
! 268: $(x^3-y^2z^2)^2$ &14 &0.7 &1.5 & 0.2\\ \hline
! 269: $y(x^5-y^2z^2)$ &18 &0.8 &0.5 & 0.1 \\ \hline
! 270: $y((y+1)x^3-y^2z^2)$ &11 &0.6 &1.1 & 0.7 \\ \hline
! 271: \end{tabular}
! 272: \caption{\cite{oaku-bfct} �$B$+$i$NNcBj�(B}
! 273: \end{table}
! 274:
! 275:
! 276: \begin{table}[hbtp]
! 277: \begin{tabular}{c|c|c|c|c} \hline
! 278: & $\deg(b(s))$ & �$BJ}K!�(B 1 & �$BJ}K!�(B 2 & �$BJ}K!�(B 3 \\ \hline
! 279: $x^4+xy^4+y^5$ &13 &135 &5.0 & 3.4 \\ \hline
! 280: $x^4+xy^5+y^6$ &13 &15 &2.9 & 2.1 \\ \hline
! 281: $x^4+xy^6+y^7$ &19 &719 &5.1 & 6.9 \\ \hline
! 282: $x^4+xy^7+y^8$ &11 &19 &7.3 & 4.0 \\ \hline
! 283: $x^4+xy^8+y^9$ &25 &-- &14 & 11 \\ \hline
! 284: $x^4+xy^9+y^{10}$ &23 &-- &22 & 14\\ \hline
! 285: $x^5+xy^5+y^6$ &21 &-- &158 & 21\\ \hline
! 286: $x^5+xy^6+y^7$ &25 &-- &32 & 19\\ \hline
! 287: \end{tabular}
! 288:
! 289: \caption{\cite{yano-bfct} �$B$+$i$NNcBj�(B}
! 290: \end{table}
! 291:
! 292: \begin{table}[hbtp]
! 293: \begin{tabular}{c|c|c|c} \hline
! 294: & $\deg(b(s))$ & �$BJ}K!�(B 2 & �$BJ}K!�(B 3 \\ \hline
! 295: $x^6+y^{12}z^8$ & 50 & 71 & 1.8 \\ \hline
! 296: $x_1x_2^3+x_3x_4^5+x_5x_6^7$ &106 & 404 & 14 \\ \hline
! 297: $(x_1x_2)^3+(x_3x_4)^3+(x_5x_6)^3$ &23 & -- & 27 \\ \hline
! 298: $(x_1x_2)^2+(x_3x_4)^2+(x_5x_6)^2+(x_7x_8)^2$ &16 & -- & 61 \\ \hline
! 299: \end{tabular}
! 300:
! 301: \caption{\cite{yano-bfct} �$B$+$i$NNcBj�(B (non-isolated singularities)}
! 302: \end{table}
! 303:
! 304: \section{�$B$*$o$j$K�(B}
! 305:
! 306: Risa/Asir �$B$K$*$1$k�(B, Weyl Algebra �$B4XO"5!G=$N<BAu$*$h$S�(B, �$B$=$N1~MQ$H$7$F�(B $b$-function
! 307: �$B$N7W;;J}K!$N2~NI$K$D$$$F=R$Y$?�(B. �$B$3$3$G=R$Y$?J}K!$K$h$j�(B, �$B$h$j9-$$HO0O$NB?9`<0$*$h$S�(B
! 308: �$B%$%G%"%k$KBP$7$F�(B $b$-function �$B$,7W;;$G$-$k$h$&$K$J$C$?$3$H$O3N$+$G$"$k�(B. �$B$7$+$7�(B,
! 309: �$B4{$KB>$NJ}K!$G7k2L$,CN$i$l$F$$$k$b$N$G$b7W;;IT2DG=$JLdBj$OB8:_$7�(B, �$B$^$?�(B
! 310: �$B$$$o$f$kB?=E�(B $b$-function �$B$KBP$7$F$O�(B, �$B:G>.B?9`<0$K$h$kJ}K!$OL5NO$G$"$k�(B.
! 311: �$B$3$l$i$KBP=h$9$k$?$a$K$O$5$i$J$k2~NI�(B, �$B$"$k$$$O?7$7$$J}K!$,I,MW$G$"$m$&�(B.
! 312:
! 313: \begin{thebibliography}{99}
! 314:
! 315: \bibitem{RUR} Noro, M., Yokoyama, K.:
! 316: A Modular Method to Compute the Rational Univariate
! 317: Representation of Zero-Dimensional Ideals.
! 318: J. Symb. Comp., {\bf 28},1 (1999) 243--263.
! 319:
! 320: \bibitem{oaku-bfct} Oaku, T.:
! 321: Algorithm for the $b$-function and
! 322: $D$-modules associated to a polynomial. J. Pure Appl. Algebra, {\bf
! 323: 117} \& {\bf 118} (1997) 495--518.
! 324:
! 325: \bibitem{deRham} Oaku, T., Takayama, N.:
! 326: An algorithm for de Rham cohomology groups of the
! 327: complement of an affine variety via $D$-module computation.
! 328: J. Pure Appl. Algebra, {\bf 139} (1999), 201--233.
! 329:
! 330: \bibitem{algDmod} Oaku, T., Takayama, N.:
! 331: Algorithms for $D$-modules ---restriction, tensor product,
! 332: localization, and local cohomology groups.
! 333: J. Pure Appl.\ Algebra (in press).
! 334:
! 335: \bibitem{SST}
! 336: Saito, M., Sturmfels, B., Takayama, N.:
! 337: Gr\"obner Deformations of Hypergeometric Differential Equations.
! 338: Algorithms and Computation in Mathematics {\bf 6}, Springer (2000).
! 339:
! 340: \bibitem{yano-bfct} Yano, T.:
! 341: On the theory of $b$-functions.
! 342: Publ. RIMS Kyoto Univ. {\bf 14} (1978), 111--202.
! 343: \end{thebibliography}
! 344:
! 345: \end{document}
! 346:
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