| version 1.3, 2000/03/28 02:02:29 |
version 1.4, 2001/02/27 08:07:24 |
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%$OpenXM: OpenXM/doc/compalg/effgr.tex,v 1.3 2000/03/28 02:02:29 noro Exp $ |
| \chapter{�$B%0%l%V%J4pDl7W;;$N8zN(2=�(B} |
\chapter{�$B%0%l%V%J4pDl7W;;$N8zN(2=�(B} |
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| �$BBh�(B \ref{chapgr} �$B>O$G%0%l%V%J4pDl$r7W;;$9$k%"%k%4%j%:%`$G$"$k�(B |
�$BBh�(B \ref{chapgr} �$B>O$G%0%l%V%J4pDl$r7W;;$9$k%"%k%4%j%:%`$G$"$k�(B |
| Line 629 $det(A'')$ �$B$KHf$Y$F2r$N78?t$,>.$5$$>l9g$G$"$k�(B. � |
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| Line 630 $det(A'')$ �$B$KHf$Y$F2r$N78?t$,>.$5$$>l9g$G$"$k�(B. � |
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| �$B$7$?>l9g$K78?t$,>.$5$/$J$k$h$&$JLdBj$G$O�(B modular �$B7W;;$,8zN($r8~>e�(B |
�$B$7$?>l9g$K78?t$,>.$5$/$J$k$h$&$JLdBj$G$O�(B modular �$B7W;;$,8zN($r8~>e�(B |
| �$B$5$;$k$3$H$,4|BT$G$-$k�(B. |
�$B$5$;$k$3$H$,4|BT$G$-$k�(B. |
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| \subsection{�$B<B83�(B} |
\subsection{�$BNc�(B} |
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| \cite{REP} �$B$G$O�(B, 4 �$BJQ?t$NBe?tJ}Dx<07O�(B (odd order �$BJ}Dx<0�(B) �$B$N%0%l%V%J4pDl7W;;�(B |
\cite{REP} �$B$G$O�(B, 4 �$BJQ?t$NBe?tJ}Dx<07O�(B (odd order �$BJ}Dx<0�(B) �$B$N%0%l%V%J4pDl7W;;�(B |
| �$B$r�(B Buchberger �$B%"%k%4%j%:%`$K$h$j9T$C$?�(B. �$B$3$N7W;;$K8=$l$kCf4V4pDl$K$*$$�(B |
�$B$r�(B Buchberger �$B%"%k%4%j%:%`$K$h$j9T$C$?�(B. �$B$3$N7W;;$K8=$l$kCf4V4pDl$K$*$$�(B |
| Line 716 $F_4$ non homo & 937 & 902 & --- & --- & --- & --- & 3 |
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| Line 717 $F_4$ non homo & 937 & 902 & --- & --- & --- & --- & 3 |
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| �$B$J$k$3$H$KBP1~$7$F$$$k�(B. �$B$=$l0J>e$N<!?t$K$D$$$F$O�(B, �$B>.$5$$78?t$r;}$D�(B |
�$B$J$k$3$H$KBP1~$7$F$$$k�(B. �$B$=$l0J>e$N<!?t$K$D$$$F$O�(B, �$B>.$5$$78?t$r;}$D�(B |
| �$BB?9`<0$K$h$k4JLs2=$G:Q$`$3$H$,9bB.2=$NM}M3$G$"$k�(B. |
�$BB?9`<0$K$h$k4JLs2=$G:Q$`$3$H$,9bB.2=$NM}M3$G$"$k�(B. |
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| \subsection{�$B9M;!�(B} |
\subsection{�$B$^$H$a�(B} |
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| $F_4$ �$B$OK\<AE*$K$O�(B Buchberger �$B%"%k%4%j%:%`$N2~NI$H9M$($i$l$k$,�(B, �$B<!$N$h$&$J�(B |
$F_4$ �$B$OK\<AE*$K$O�(B Buchberger �$B%"%k%4%j%:%`$N2~NI$H9M$($i$l$k$,�(B, �$B<!$N$h$&$J�(B |
| �$BD9=j$r;}$D�(B. |
�$BD9=j$r;}$D�(B. |
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| Line 727 $F_4$ �$B$OK\<AE*$K$O�(B Buchberger �$B%"%k%4%j%:%`$N2 |
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| Line 727 $F_4$ �$B$OK\<AE*$K$O�(B Buchberger �$B%"%k%4%j%:%`$N2 |
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| �$BA]$-=P$77W;;$,8zN(2=$9$k�(B. (�$B!VBP3Q2=!W$5$l$?9TNs$K$h$k4JLs2=�(B vs. �$B!V;03Q2=!W�(B |
�$BA]$-=P$77W;;$,8zN(2=$9$k�(B. (�$B!VBP3Q2=!W$5$l$?9TNs$K$h$k4JLs2=�(B vs. �$B!V;03Q2=!W�(B |
| �$B$5$l$?9TNs$K$h$k4JLs2=�(B) |
�$B$5$l$?9TNs$K$h$k4JLs2=�(B) |
| \item reduced �$B$J4pDl$N78?t$,>.$5$/$J$k>l9g$K$O�(B, modular �$B7W;;$K$h$k�(B |
\item reduced �$B$J4pDl$N78?t$,>.$5$/$J$k>l9g$K$O�(B, modular �$B7W;;$K$h$k�(B |
| �$B8zN(2=$,4|BT$G$-$k�(B. �$B$?$@$7�(B, �$B$3$N>l9g$K$O�(B, �$B9TNs$N3F9T$N�(B 0 �$B4JLs%A%'%C%/�(B |
�$B8zN(2=$,4|BT$G$-$k�(B. |
| �$B$,I,?\$G$"$k�(B. |
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| \end{itemize} |
\end{itemize} |
| �$B8zN($K4X$7$F$$$($P�(B, Risa/Asir �$B$G$N8=>u$O�(B, Faug\`ere �$B$N�(B home page |
�$B0lJ}$G�(B, |
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| \centerline{{\tt http://posso.lib6.fr/\til jcf/bench.html}} |
\begin{itemize} |
| \noi |
\item �$BB??t$N�(B S-�$BB?9`<0$*$h$S�(B reducer �$B$r0lEY$K9TNs$H$7$F07$&$?$a$K�(B, |
| �$B$K$"$k%G!<%?$K5Z$V$Y$/$b$J$$�(B. �$B$?$H$($P�(B, odd order �$BJ}Dx<0$G�(B, P6-200MHz |
�$B5pBg$J%a%b%j$rI,MW$H$9$k>l9g$,$7$P$7$P@8$:$k�(B. |
| PC �$B>e$G�(B 54 �$BIC$HJs9p$5$l$F$$$k�(B. �$B$7$+$7�(B, Faug\`ere\cite{F} �$B$K�(B, |
\item �$B0lHL$K9TNs$OAB$H$J$k$?$a�(B, �$BBg5,LOAB9TNs$r8zN($h$/J];}$7�(B, �$BA]$-=P$9I,MW�(B |
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�$B$,$"$k�(B. |
| Moreover, since big integer computations could be done by means of |
\item modular �$B7W;;$r9T$&>l9g�(B, �$B9TNs$N3F9T$N�(B 0 �$B4JLs%A%'%C%/�(B |
| p-adic or multi modular arithmetics it means that the cost of an |
�$B$K$h$k%*!<%P!<%X%C%I$,LdBj$H$J$k�(B. |
| integer computation is roughly |
\end{itemize} |
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�$B$J$I$N:$Fq$K$h$j�(B, �$B<BMQE*$J<BAu$r9T$&$K$O�(B Buchberger �$B%"%k%4%j%:%`$HF1MM�(B |
| \centerline{time of modular computation * size of the output coeffs} |
�$B$5$^$6$^$J9)IW$,I,MW$H$J$k�(B. �$B$H$O$$$(�(B, �$BA0@a$NNc$G8+$?$h$&$K�(B, �$B<B83E*$J<B�(B |
| \noi |
�$BAu$G$b=>Mh$N�(B Buchberger �$B%"%k%4%j%:%`$h$j8zN($h$/7W;;$G$-$k>l9g$,$"$k$3�(B |
| �$B$H=q$+$l$F$$$k$3$H$+$i�(B, �$BCf4V4pDl$KBP$9$k@5Ev@-%A%'%C%/$I$3$m$+�(B, �$BC1$J$k�(B |
�$B$H$O3N$+$G�(B, Faug\`ere �$B$K$h$k$b$N0J30$K$b$5$^$6$^$J<BAu<B83$,9T$o$l$k$3$H$,�(B |
| modular �$B%0%l%V%J4pDl7W;;$r�(B, �$BCf9q>jM>DjM}$K$h$k7k2L$,�(B stable �$B$K$J$k$^$G7+$jJV$7$F�(B |
�$B4|BT$5$l$k�(B. |
| �$B$$$k$@$1�(B, �$B$H$$$&2DG=@-$b<N$F@Z$l$J$$�(B. �$BH`$,$b$&>/$7<BAu$rL@$i$+$K$7$F$/$l$k�(B |
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| �$B$3$H$rK>$s$G$$$k�(B. |
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| Faug\`ere �$B$O�(B, |
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| \begin{enumerate} |
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| \item Buchberger �$B%"%k%4%j%:%`$K$*$1$k�(B selection strategy �$B$HHf$Y$F�(B, |
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| $F_4$ �$B$G$O�(B ``make no choice'' |
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| \item non homogeneous case �$B$N5sF0$r8+$l$P�(B, $F_4$ �$B$O�(B Buchberger �$B%"%k%4%j%:%`�(B |
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| �$B$G$O$J$$�(B. |
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| \end{enumerate} |
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| �$B$H=q$$$F$$$k$,�(B, 1. �$B$K4X$7$F$O�(B, critcal pair �$B$N�(Bsubset �$B$r$I$&A*$V$+$G�(B, |
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| �$B8zN($KBg$-$/:9$,=P$k$3$H$O�(B, odd order �$BJ}Dx<0$NNc$+$iL@$i$+$G$"$k�(B. �$B$^$?�(B, |
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| 2. �$B$K4X$7$F$O�(B, �$B%"%k%4%j%:%`$N4pK\9=B$$OL@$i$+$K�(B Buchberger�$B%"%k%4%j%:%`�(B |
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| �$B$G$"$j5?Ld$G$"$k�(B. �$B$H$O$$$(�(B, �$B=>Mh$N�(B Buchberger�$B%"%k%4%j%:%`$h$j8zN($h$/�(B |
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| �$B7W;;$G$-$k>l9g$,$"$k$3$H$O3N$+$G$"$j�(B, �$B3FIt$N2~NI$r4^$a$F�(B, �$B$h$j8zN($h$$�(B |
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| �$B<BAu$rL\;X$9$3$H$,<BMQ>e=EMW$G$"$k$H9M$($i$l$k�(B. |
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