=================================================================== RCS file: /home/cvs/OpenXM/doc/Papers/rims-2002-noro-ja.tex,v retrieving revision 1.2 retrieving revision 1.3 diff -u -p -r1.2 -r1.3 --- OpenXM/doc/Papers/rims-2002-noro-ja.tex 2002/12/06 09:23:42 1.2 +++ OpenXM/doc/Papers/rims-2002-noro-ja.tex 2002/12/09 02:09:23 1.3 @@ -1,6 +1,13 @@ -% $OpenXM: OpenXM/doc/Papers/rims-2002-noro-ja.tex,v 1.1 2002/12/04 08:57:21 noro Exp $ +% $OpenXM: OpenXM/doc/Papers/rims-2002-noro-ja.tex,v 1.2 2002/12/06 09:23:42 noro Exp $ \documentclass[theorem]{jarticle} -\usepackage{jssac} +%\usepackage{jssac} +%\topmargin -0.5in +%\oddsidemargin -0.25in +%\evensidemargin -0.25in +% +%\textwidth 7in +%\textheight 9in +%\columnsep 0.33in \def\HT{{\rm HT}} \def\HC{{\rm HC}} @@ -20,8 +27,8 @@ \section{$B$O$8$a$K(B} $BK\9F$G$O(B, \cite{funny01} $B$G=R$Y$?(B, $BM-8BBN>e$G$N(B 2 $BJQ?tB?9`<0$N0x?tJ,2r(B -$B$r4pAC$H$7$F(B, $B0lHL$NB?JQ?tB?9`<0$N(B GCD, $BL5J?J}J,2r(B, $B0x?tJ,2r%"%k%4%j%:%`(B -$B$*$h$S$=$N $a \leftarrow $ $BL$;HMQ$N(B $K$ $B$N85(B\\ \> $g_a \leftarrow \GCD(f_1|_{y=a},\ldots,f_m|_{y=a})$\\ \> if \= $g \neq 0$ $B$+$D(B $\HT_<(g) = \HT_<(g_a)$ then \\ - \> \> $adj \leftarrow \cdot h_g(a)/\HC_<(g_a)\cdot g_a - g(a))$\\ - \> \> if \= $adj = 0$ $B$+$D(B, $B$9$Y$F$N(B $f_i$ $B$KBP$7(B $g | hg\cdot f_i$ then \\ + \> \> $adj \leftarrow h_g(a)/\HC_<(g_a)\cdot g_a - g(a)$\\ + \> \> if \= $adj = 0$ $B$+$D(B, $B$9$Y$F$N(B $f_i$ $B$KBP$7(B $g | h_g\cdot f_i$ then \\ \> \> \> return $\pp(g)$\\ \> \> endif\\ \> \> $g \leftarrow g+adj \cdot M(a)^{-1} \cdot M$; $M \leftarrow M\cdot (y-a)$\\ - \> else if $\tdeg(\HT_<(g)) > \tdeg(\HT_<(g_a)$ then \\ + \> else if $\tdeg(\HT_<(g)) > \tdeg(\HT_<(g_a))$ then \\ \> \> $g \leftarrow g_a$; $M \leftarrow y-a$\\ \> else if $\tdeg(\HT_<(g)) = \tdeg(\HT_<(g_a))$ then \\ \> \> $g \leftarrow 0$; $M \leftarrow 1$\\ @@ -147,23 +154,28 @@ $x$ $B$O(B, $x$ $B$K4X$9$kHyJ,$,>C$($J$$$h$&$KA*$VI \subsection{2 $BJQ?t$N0x?tJ,2r(B} -$x$, $y$ $B$,7h$^$C$?$i(B, $f_a(x,y) = f(x,y,a)$ $B$,(B, +$x$, $y$ $B$,7h$^$C$?$i(B, $f_a(x,y) = f(x,y,a)$ $B$,(B $BL5J?J}$K$J$k$h$&$K(B $Z$ $B$KBeF~$9$kCM$N%Y%/%H%k(B $a = (a_1,\ldots,a_{n-2}) \in K^{n-2}$ $B$rA*$S(B, $f_a$ $B$r0x?tJ,2r$9$k(B. $B$3$3$G(B, $f_a$ $B$N(B $x$ $B$K4X$9$kDj$G9T$o$l$F$$$k$?$a(B, $B$=$N7k2L$r$=$N$^$^JV$9$h$&$JFbIt(B +$B%5%V%k!<%A%s$r8F$S=P$7$F$$$k(B. \subsection{$K[y]$ $B>e$G$N(B Hensel $B9=@.(B ($BA0=hM}(B)} $f_a(x,y)$ $B$N0x?tJ,2r$N7k2L$h$j(B, $B0x;R$r(B 2 $BAH$K$o$1(B $f_a(x,y) = g_0(x,y)h_0(x,y)$ $B$H$7$?>e$G(B, $K[y]$ $B>e$G(B Hensel $B9=@.$r(B $B9T$&(B. $B$3$N:](B, $BLdBj$H$J$k$N$,(B $g_0$, $h_0$ $B$N(B $x$ $B$K4X$9$k/$J$/$H$b(B, -$B$=$l$O(B, $f$ $B$N(B, $x$ $B$K4X$9$ke$N>l9g(B, P. S. Wang $B$K$h$je$N(B Hensel $B9=@.$K$h$j(B, $f=g_kh_k \bmod I^{k+1}$, $B$?$@$7(B -$I = $, $B$H$J$k(B $g_k$, $h_k$ $B$r(B EZ $BK!$K(B +$I = \langle z_1-a_1,\ldots,z_{n-2}-a_{n-2} \rangle$, $B$H$J$k(B $g_k$, $h_k$ $B$r(B EZ $BK!$K(B $B$h$j7W;;$9$k(B. $B$^$:(B, $z_i \rightarrow z_i+a_i$ $B$J$kJ?9T0\F0$K$h$j(B, -$I=$ $B$H$7$F$*$/(B. $BDL>o$N(B EZ $BK!$G$O(B, $B78?t$KJ,?t$,(B +$I=\langle z_1,\ldots,z_{n-2} \rangle$ $B$H$7$F$*$/(B. $BDL>o$N(B EZ $BK!$G$O(B, $B78?t$KJ,?t$,(B $B8=$l$k$N$rHr$1$k$?$a(B, $B0x;R$N78?t$NBg$-$5$NI>2A$+$iDj$a$i$l$k(B, $B$"$kBg$-$JAG?t6R(B $p^l$ $B$rK!$H$7$F(B $\Z/(p^l)$ $B>e$G7W;;$9$k(B. $B$3$3$G$O(B, $f$ $B$N(B $y$ $B$K4X$9$kl9g$K(B, $B<+F0E*$K4pACBN$r3HBg$9$k(B +\item $BBN$N0L?t$,B-$j$J$$>l9g$K(B, $B<+F0E*$K4pACBN$r3HBg$9$k(B. -\item $B3FItJ,$N8zN(2=(B +\item $BBN$NI8?t$,==J,Bg$-$$>l9g$K(B, $BL5J?J}J,2r$rI8?t(B 0 $B$H(B +$BF1MM$N(B Hensel $B9=@.$G9T$&$h$&$K$9$k(B. + +\item 2 $BJQ?t$N0x?tJ,2r$K$*$$$F(B, \cite{funny01} $B$G=R$Y$?(B, $BB?9`<0(B +$B;~4V%"%k%4%j%:%`$r<+F0E*$KA*Br$7$F