File: [local] / OpenXM / doc / Papers / jsiamb-noro.tex (download)
Revision 1.4, Tue Oct 9 01:44:21 2001 UTC (22 years, 7 months ago) by noro
Branch: MAIN
CVS Tags: R_1_3_1-2, RELEASE_1_3_1_13b, RELEASE_1_2_3_12, RELEASE_1_2_3, RELEASE_1_2_2_KNOPPIX_b, RELEASE_1_2_2_KNOPPIX, RELEASE_1_2_2, RELEASE_1_2_1, KNOPPIX_2006, HEAD, DEB_REL_1_2_3-9
Changes since 1.3: +98 -29
lines
Reorganized the slides.
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% $OpenXM: OpenXM/doc/Papers/jsiamb-noro.tex,v 1.4 2001/10/09 01:44:21 noro Exp $
\setlength{\parskip}{10pt}
\begin{slide}{}
\fbox{\bf �$B7W;;5!Be?t%7%9%F%`�(B Risa/Asir}
\begin{itemize}
\item �$BB?9`<04D$K$*$1$kBg5,LO9bB.7W;;$rL\;X$7$F3+H/�(B
\begin{itemize}
\item C �$B$G5-=R�(B
\item �$B%a%b%j4IM}$O�(B Boehm's conservative GC [Boehm] �$B$K$h$k�(B
\end{itemize}
\item C �$B8@8l$K;w$?%f!<%68@8l%$%s%?%U%'!<%9$r$b$D�(B.
\begin{itemize}
\item �$B7?@k8@$J$7�(B
\item �$B%f!<%68@8l%G%P%C%,$,AH$_9~$_�(B
\end{itemize}
\item �$B%*!<%W%s%=!<%9�(B
\begin{itemize}
\item 2000 �$BG/$^$GIY;NDL8&$G3+H/�(B
$\Rightarrow$ 2001 �$BG/$h$j�(B Kobe branch [Risa/Asir]
�$B$,%9%?!<%H�(B
\item CVS �$B$G:G?7HG$,F~<j2DG=�(B (�$BF~<jJ}K!$O8e=R�(B)
\end{itemize}
\item OpenXM ((Open message eXchange protocol for Mathematics) �$B%$%s%?%U%'!<%9�(B
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B<g$J5!G=�(B}
\begin{itemize}
\item �$BB?9`<0$N4pK\1i;;�(B
\begin{itemize}
\item �$B2C8:>h=|�(B, GCD, �$B=*7k<0�(B etc.
\end{itemize}
\item �$BB?9`<00x?tJ,2r�(B
\begin{itemize}
\item �$B0lJQ?tB?9`<0�(B : �$B78?tBN$OM-M}?tBN�(B, �$BBe?tBN�(B, �$B<o!9$NM-8BBN�(B
\item �$BB?JQ?tB?9`<0�(B : �$B78?tBN$OM-M}?tBN�(B
\end{itemize}
\item �$B%0%l%V%J4pDl7W;;�(B
\begin{itemize}
\item Buchberger �$B%"%k%4%j%:%`�(B, Fag\`ere $F_4$ [Faug\`ere] �$B%"%k%4%j%:%`�(B
�$BB?9`<04D$*$h$S�(B Weyl �$BBe?t�(B
\item 0 �$B<!85%$%G%"%k$N�(B change of ordering/RUR [Rouillier]
�$BBe?tJ}Dx<0$N2r$r�(B, �$B0lJQ?tB?9`<0$N:,$GI=$9�(B
\item �$B=`AG%$%G%"%kJ,2r�(B [SY]
�$BB?JQ?tBe?tJ}Dx<07O$N2r$NJ,2r$rM?$($k�(B
\item �$BB?9`<0$N�(B $b$-�$B4X?t�(B (Bernstein-Sato polynomial) �$B$N7W;;�(B [Oaku]
$b$-�$B4X?t�(B : �$BB?9`<0$NNmE@$G$"$kD66JLL$NITJQNL�(B
$D$-�$B2C72$K$*$1$k7W;;$N�(B, �$BM-8B<!85$N@~7ABe?t$X$N5"Ce$KI,MW�(B
\end{itemize}
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B<g$J5!G=�(B (�$B$D$E$-�(B)}
\begin{itemize}
\item PARI [PARI] �$B%i%$%V%i%j%$%s%?%U%'!<%9�(B
�$B?tO@%i%$%V%i%j�(B PARI �$B$r%j%s%/$7$F$$$F<g$J4X?t$,8F$Y$k�(B
bigfloat �$B7W;;�(B, �$BD61[4X?t$NI>2A$K$bMQ$$$i$l$k�(B
\item OpenXM �$B$N85$G$NJ,;6JBNs7W;;�(B
OpenXM �$B$K$h$kF1<o$^$?$O0[<o$N?t3X%=%U%H%&%'%"$N7k9g�(B
client-server �$B7?J,;6JBNs7W;;$,MF0W$K<B83$G$-$k�(B
\item 2 �$BJQ?t4X?t$NNmE@$N@:L)IA2h�(B
�$BCf4VCM$NDjM}�(B, Sturm �$BNs$NMxMQ$K$h$k�(B, 2 �$BJQ?t4X?t$NNmE@$N@:L)IA2h�(B
OpenXM server �$B$H$7$F<B8=�(B
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B3+H/$NNr;K�(B : ---1994}
\begin{itemize}
\item --1989
Prolog �$B$N%5%V%k!<%A%s$H$7$F�(B, �$B$$$/$D$+$N5!G=$r3+H/�(B
\item 1989--1992
\begin{itemize}
\item parser �$B$*$h$S�(B Boehm �$B$N�(B GC [Boehm] �$B$H$H$b$K�(B Risa/Asir �$B$,%9%?!<%H�(B
\item �$BM-M}?tBN>e0lJQ?t�(B, �$BB?JQ?tB?9`<0$N0x?tJ,2r$r3+H/�(B
\end{itemize}
\item 1992--1994
\begin{itemize}
\item Buchberger �$B%"%k%4%j%:%`$N<BAu3+;O�(B
�$B%f!<%68@8l$G5-=R�(B $\Rightarrow$ C �$B$G=q$-D>$7�(B (by �$BB<Hx�(B@�$B8=:_EEDLBg�(B)
$\Rightarrow$ trace lifting [Traverso] �$B$N<BAu�(B
\item �$BBe?tBN>e$N0lJQ?tB?9`<0$N0x?tJ,2r�(B
�$BC`<!3HBg$*$h$S�(B, �$B=EJ#0x;R$r$b$D%N%k%`$NAH?%E*MxMQ�(B
\end{itemize}
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B3+H/$NNr;K�(B : 1994-1996}
\begin{itemize}
\item �$B%P%$%J%jHG$rIY;NDL$h$j8x3+�(B
\item �$B=`AG%$%G%"%kJ,2r$N<BAu�(B
\begin{itemize}
\item �$B2<;3�(B-�$B2#;3%"%k%4%j%:%`�(B [SY]
\end{itemize}
\item Buchberger �$B%"%k%4%j%:%`$N2~NI�(B
\begin{itemize}
\item Trace lifting+�$B@F<!2=�(B
\item compatible prime �$B$K$h$k%0%l%V%J4pDl%A%'%C%/$N>JN,�(B
\item Modular change of ordering, Modular RUR
�$B2#;3$H$N6&F18&5f�(B [NY]
\end{itemize}
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B3+H/$NNr;K�(B : 1996-1998}
\begin{itemize}
\item �$BJ,;67W;;5!G=$N<BAu�(B
\begin{itemize}
\item OpenXM �$B$N%W%m%H%?%$%W�(B
\end{itemize}
\item Buchberger �$B%"%k%4%j%:%`$N2~NI�(B
\begin{itemize}
\item �$B@55,7A7W;;Cf$K$*$1$k78?t$N6&DL0x;R$N8zN(E*=|5n�(B
\item �$B$=$NJBNs2=�(B
\item odd order replicable functions �$B$N7W;;�(B [Noro]
Risa/Asir : DRL basis �$B7W;;�(B({\it McKay}) �$B$K�(B 5 �$BF|$+$+$C$?�(B
Faug\`ere �$B$N�(B FGb : �$B$3$N7W;;$r�(B 53 �$BIC$G<B9T�(B
\end{itemize}
\item �$BBg$-$JM-8BBN>e$N0lJQ?tB?9`<0$N0x?tJ,2r�(B
\begin{itemize}
\item Schoof-Elkies-Atkin �$B%"%k%4%j%:%`$N<BAu$N$?$a�(B
�$BM-8BBN>e$NBJ1_6J@~$NM-M}E@8D?t7W;;MQ�(B
--- �$B$3$N%W%m%0%i%`$O%U%j!<$G$O$J$$$,�(B, �$B4X78$9$k4X?t$O%U%j!<�(B
\end{itemize}
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B3+H/$NNr;K�(B : 1998-2000}
\begin{itemize}
\item OpenXM
\begin{itemize}
\item OpenXM �$B;EMM=q�(B : �$BLnO$�(B, �$B9b;3�(B [OpenXM]
enconding, phrasebook �$B$K4X$9$k%"%$%G%#%"$O�(B OpenMath [OpenMath] �$B$+$i<ZMQ�(B
\item �$BJ,;67W;;4X?t$O�(B, OpenXM �$B;EMM$K=q$-D>$7�(B
\end{itemize}
\item Risa/Asir on Windows
\begin{itemize}
\item �$B;E;v>eI,MW$K$J$C$?�(B
Visual C++ �$B$G5-=R�(B
\end{itemize}
\item $F_4$ �$B$N;n83<BAu�(B
\begin{itemize}
\item �$BO@J8�(B [Faug\`ere] �$B$K=`5r$7$F5-=R�(B
\item $GF(p)$ �$B>e�(B : �$B$J$+$J$+$h$$�(B
\item �$BM-M}?tBN>e�(B :{\it McKay} �$B$r=|$$$F$@$a�(B
\end{itemize}
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B3+H/$NNr;K�(B : 2000-current}
\begin{itemize}
\item �$B%*!<%W%s%=!<%92=�(B
\begin{itemize}
\item �$BLnO$$,IY;NDL8&$h$j?@8MBg$K0\@R�(B
Kobe branch �$B$N%9%?!<%H�(B
\end{itemize}
\item OpenXM
\begin{itemize}
\item �$B;EMM=q�(B : OX-RFC100, 101, (102)
\item OX-RFC102 (�$BL$40@.�(B) : MPI �$B$rMQ$$$?%5!<%P4VDL?.�(B
\end{itemize}
\item Weyl �$BBe?t�(B
\begin{itemize}
\item Buchberger �$B%"%k%4%j%:%`�(B [Takayama]
\item $b$-�$B4X?t�(B
$b$-�$B4X?t$r:G>.B?9`<0$H$7$F%b%8%e%i7W;;�(B
\end{itemize}
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B@-G=�(B --- �$B0x?tJ,2r�(B}
\begin{itemize}
\item 10 �$BG/A0�(B
REDUCE, Mathematica �$B$KHf$Y$F9b@-G=$@$C$?�(B
\item 4 �$BG/A0�(B
�$B%N%k%`$+$i@8$8$kB?9`<0$N0x?tJ,2r$KBP$9$k%H%j%C%/$K�(B
�$B$h$j�(B, �$BBe?tBN>e$NJ,2r$O0MA3$H$7$FM%0L$@$C$?�(B
\item �$B8=:_�(B
�$BB?JQ?t�(B : �$B$^$:$^$:�(B
�$BM-M}?tBN>e0lJQ?t�(B : M. van Hoeij �$B$N?7%"%k%4%j%:%`$K$h$j40A4$KIi$1�(B
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B@-G=�(B --- �$B%0%l%V%J4pDl4XO"5!G=�(B}
\begin{itemize}
\item 8 �$BG/A0�(B
�$B$H$j$"$($:F0$/DxEY$N@-G=�(B
\item 7 �$BG/A0�(B
Trace lifting �$B$K$h$j9b@-G=$@$C$?$,�(B, Faug\`ere �$B$N�(B Gb �$B$K$O�(B
�$BIi$1$F$$$?�(B
�$B$7$+$7�(B, �$B@F<!2=$H$NAH9g$;$K$h$j�(B, �$B$h$j9-$$HO0O$NF~NO$KBP$7$F%0%l%V%J�(B
�$B4pDl$,7W;;$G$-$k$h$&$K$J$C$?�(B
\item 4 �$BG/A0�(B
Modular RUR �$B7W;;$O�(B Rouillier �$B$N<BAu$HHf3S$7$FF1Ey$"$k$$$OM%0L$@$C$?�(B
\item �$B8=:_�(B
FGb �$B$O�(B Risa/Asir �$B$N�(B $F_4$ �$B<BAu$h$j$:$$$V$s9bB.$N$h$&�(B
Singular [Singular] �$B$OB?9`<0$N8zN($h$$I=8=$K$h$j�(B, Risa/Asir �$B$N?tG\9bB.�(B
�$B$N>l9g$b$"$k�(B. (�$B78?t$,Bg$-$/$J$k>l9g$O$^$@�(B Risa/Asir �$B$,M%0L�(B)
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$BBg5,LO7W;;$X$NBP1~�(B}
\begin{itemize}
\item �$B%0%l%V%J4pDl7W;;Cf$K@8@.$5$l$?4pDl$r%G%#%9%/$KJ]B8�(B
\begin{itemize}
\item �$B<g5-21$NM-8zMxMQ�(B
\item �$BESCf$+$i7W;;$r:F3+$G$-$k�(B
\end{itemize}
\item OpenXM �$B$K$h$kJ,;67W;;�(B
\begin{itemize}
\item �$B$5$^$6$^$J%?%$%W$NJBNs7W;;$KBP1~�(B
OX-RFC100, 101 : client-server �$B7?�(B (OX-RFC100, 101)
OX-RFC102 : server-server �$BDL?.�(B, collective operation
\item �$BJBNs2=$K$h$kBf?t8z2L�(B
\item �$BJ#?t$N%"%k%4%j%:%`$N6%AhE*<B9T$,MF0W�(B
�$B7W;;NL$K$h$k8zN($NDjNLE*Hf3S$,$G$-$J$$>l9g�(B
�$B3d$j9~$_$K$h$kCfCG�(B, �$BI|5"$,MF0W�(B
$\Rightarrow$ �$B%G!<%?$rJ];}$7$?$^$^7W;;$,B39T$G$-$k�(B
\end{itemize}
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B1~MQ;vNc�(B}
\begin{itemize}
\item �$BBJ1_6J@~0E9f%Q%i%a%?@8@.�(B [IKNY]
�$BM-8BBN>e$NB?9`<00x?tJ,2r$N1~MQ�(B
\item $D$-�$B2C72$K$*$1$k<o!9$N7W;;�(B
de Rham �$B%3%[%b%m%8!<�(B, �$BBe?tE*6I=j%3%[%b%m%8!<�(B, $D$-�$B2C72$N@)8B�(B, �$B%F%s%=%k@Q�(B
�$B7W;;$K$*$$$F�(B, �$BB?9`<00x?tJ,2r�(B, �$B=`AGJ,2r�(B, $b$-�$B4X?t7W;;$rC4Ev�(B (OpenXM �$B7PM3�(B)
\item �$BBe?tJ}Dx<07O$N5a2r�(B
�$B;;K!�(B, �$B<BAuN>LL$+$iBg5,LO7W;;$KBP1~�(B
�$BL$Dj78?tK!$K$h$k2D@QJ,7O$N7hDj�(B
�$BBPOCE*%7%9%F%`$N%P%C%/%(%s%I$GBe?tJ}Dx<05a2r�(B(�$B%0%l%V%J4pDl7W;;�(B)
\item �$B%"%k%4%j%:%`<BAu<B83%D!<%k�(B
�$BIbF0>.?t78?t%0%l%V%J4pDl7W;;�(B, Wu �$B$NJ}K!�(B, �$B6h4V1i;;�(B
�$B$J$I$N%"%k%4%j%:%`$N<BAu<B83�(B. �$B%=!<%9%l%Y%k$G$N�(B
�$B2~JQ$b2DG=�(B
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf �$B8=:_3+H/Cf�(B(�$BM=Dj�(B)�$B$N5!G=�(B}
\begin{itemize}
\item �$BM-8BBN>e$NB?JQ?tB?9`<0$N0x?tJ,2r�(B, �$BM-8BBN>e$N=`AGJ,2r�(B
\begin{itemize}
\item �$BBe?t4v2?Id9f$X$N1~MQ$r8+9~$s$@M-8BBN>e$N=`AGJ,2r<BAu�(B
\item �$BI8?t$,>.$5$$>l9gFCM-$N:$Fq$,$"$k�(B
\item �$B4pAC$H$J$kM-8BBN>e$NB?JQ?tB?9`<0$N0x?tJ,2r$r<BAuCf�(B
\end{itemize}
\item �$B$h$j9-HO$J%G!<%?$NJ];}J}K!�(B, �$B5-=RG=NO$N8~>e�(B
\begin{itemize}
\item �$B8=>u$G$O�(B, �$B2D49B?9`<04D0J30$N%G!<%?$N<+A3$J<h$j07$$$,:$Fq�(B
\item �$B0[<o%7%9%F%`$H$N%G!<%?8r49�(B, �$B%f!<%6$K$h$k�(B flexible �$B$J�(B
�$B%G!<%?=hM}$,2DG=$J$h$&$KFbItI=8=$r3HD%Cf�(B
\end{itemize}
\item �$B2C72BP1~�(B
\begin{itemize}
\item �$BEvA3$"$C$F$7$+$k$Y$-$J$N$K$J$+$C$?�(B
Buchberger �$B%"%k%4%j%:%`$OMF0W�(B, �$B<+M3J,2r$OBgJQ�(B
\end{itemize}
\item �$B@~7ABe?t�(B
\begin{itemize}
\item �$B8=>u$O$"$^$j$KIO<e�(B. �$B$7$+$7�(B, �$B9-HO0O$NF~NO$KBP1~$9$k$N$OFq$7$$�(B.
\end{itemize}
\end{itemize}
\end{slide}
\begin{slide}{}
\fbox{\bf RUR �$B7W;;$*$h$SAH$_9~$_%G%P%C%,;HMQK!$NNc�(B }
�$BJ}Dx<0�(B : $\{f_1(x_1,\ldots,x_n)=0, \ldots, f_m(x_1,\ldots,x_n)=0\}$
lex �$B=g=x%0%l%V%J4pDl�(B : $\{g_1(x_1)=0, x_2 = h_2(x_1),\ldots,
x_n=h_n(x_1)\}$
RUR : $\{g_1(x_1)=0, x_2 = {g_2(x_1) \over g'_1(x_1)},\ldots,
x_n={g_n(x_1) \over g'_1(x_1)}\}$
$\Rightarrow$ $g_i$ �$B$N78?t�(B $<<$ $h_i$ �$B$N78?t�(B
�$B4JC1$JLdBj�(B (Katsura-N) �$B$G<B:]$KHf3S�(B
+ �$B7W;;ESCf$N3d$j9~$_$+$i%G%P%C%0%b!<%I$X$N0\9T�(B, �$BJQ?t$NFbMF�(B
�$B$NI=<($N%G%b�(B
\end{slide}
\begin{slide}{}
\fbox{\bf �$BJ,;67W;;$NNc�(B --- $F_4$ vs. $Buchberger$ }
\begin{verbatim}
/* competitive Gbase computation over GF(M) */
/* Cf. A.28 in SINGULAR Manual */
/* Process list is specified as an option : grvsf4(...|proc=P) */
def grvsf4(G,V,M,O)
{
P = getopt(proc);
if ( type(P) == -1 ) return dp_f4_mod_main(G,V,M,O);
P0 = P[0]; P1 = P[1]; P = [P0,P1];
map(ox_reset,P);
ox_cmo_rpc(P0,"dp_f4_mod_main",G,V,M,O);
ox_cmo_rpc(P1,"dp_gr_mod_main",G,V,0,M,O);
map(ox_push_cmd,P,262); /* 262 = OX_popCMO */
F = ox_select(P); R = ox_get(F[0]);
if ( F[0] == P0 ) { Win = "F4"; Lose = P1;}
else { Win = "Buchberger"; Lose = P0; }
ox_reset(Lose); /* simply resets the loser */
return [Win,R];
}
\end{verbatim}
\end{slide}
\begin{slide}{}
\fbox{\bf �$BF~<jJ}K!�(B : �$BF?L>�(B CVS}
�$B>r7o�(B : CVS �$B$,%$%s%9%H!<%k:Q�(B ({\tt http://www.cvshome.org/} �$B$+$iF~<j2DG=�(B)
�$B:G=i$O%Q%9%o!<%IEPO?$,I,MW�(B
\begin{verbatim}
% setenv CVSROOT :pserver:anoncvs@kerberos.math.kobe-u.ac.jp:/home/cvs
% cvs login
\end{verbatim}
�$B%Q%9%o!<%I�(B : anoncvs $\Rightarrow$ {\tt \$HOME/.cvspass}
\begin{verbatim}
% setenv CVSROOT :pserver:anoncvs@kerberos.math.kobe-u.ac.jp:/home/cvs
% cvs checkout OpenXM OpenXM_contrib OpenXM_contrib2
\end{verbatim}
�$B$3$l$G�(B, {\tt OpenXM}, {\tt OpenXM\_contrib}, {\tt OpenXM\_contrib2}
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\end{slide}
\begin{slide}{}
\fbox{\bf �$B;29MJ88%�(B}
[Bernardin] L. Bernardin, On square-free factorization of
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[Boehm] {\tt http://www.hpl.hp.com/personal/Hans\_Boehm/gc}
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A new efficient algorithm for computing Groebner bases ($F_4$),
Journal of Pure and Applied Algebra (139) 1-3 (1999), 61-88.
[Hoeij] M. van Hoeij, Factoring polynomials and the knapsack problem,
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A Modular Method to Compute the Rational Univariate
Representation of Zero-Dimensional Ideals.
J. Symb. Comp. {\bf 28}/1 (1999), 243-263.
\end{slide}
\begin{slide}{}
[Oaku] T. Oaku, Algorithms for $b$-functions, restrictions and algebraic
local cohomology groups of $D$-modules.
Advancees in Applied Mathematics, 19 (1997), 61-105.
[OpenMath] {\tt http://www.openmath.org}
[OpenXM] {\tt http://www.openxm.org}
[PARI] {\tt http://www.parigp-home.de}
[Risa/Asir] {\tt http://www.math.kobe-u.ac.jp/Asir/asir.html}
[Rouillier] F. Rouillier,
R\'esolution des syst\`emes z\'ero-dimensionnels.
Doctoral Thesis(1996), University of Rennes I, France.
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[Singular] {\tt http://www.singular.uni-kl.de}
[Traverso] C. Traverso, \gr trace algorithms. Proc. ISSAC '88 (LNCS 358), 125-138.
\end{slide}
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