| version 1.3, 2001/07/24 09:35:54 |
version 1.4, 2001/07/25 05:44:01 |
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| % $OpenXM: OpenXM/doc/sci-semi2001/factorb.tex,v 1.2 2001/07/24 08:02:47 noro Exp $ |
% $OpenXM: OpenXM/doc/sci-semi2001/factorb.tex,v 1.3 2001/07/24 09:35:54 noro Exp $ |
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| Line 187 $\Rightarrow$ {\ec �$B:,$rC5$9J}K!$OE,MQ:$Fq�(B} |
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| Line 187 $\Rightarrow$ {\ec �$B:,$rC5$9J}K!$OE,MQ:$Fq�(B} |
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| \vskip 1cm |
\vskip 1cm |
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| \underline{\uc �$B%3%s%T%e!<%?$K$ONO5;�(B(�$B7+$jJV$7�(B)�$B$,;w9g$&�(B} |
\underline{\uc �$B%3%s%T%e!<%?$K9g$C$?J}K!$O�(B?} |
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\begin{itemize} |
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\item {\eec �$B!V6a;w!W�(B}�$B$r$&$^$/;H$&�(B |
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| {\eec �$BCf4VCM$NDjM}�(B} = {\eec �$B<B?t$K$*$1$k6a;w�(B} �$B$NMxMQ�(B |
{\eec �$BCf4VCM$NDjM}�(B} = {\eec �$B<B?t$K$*$1$k6a;w�(B} �$B$NMxMQ�(B |
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| �$BJL$N6a;w�(B $\Rightarrow$ {\ec �$B3d$C$?M>$j�(B}�$B$KCmL\�(B |
�$BJL$N6a;w�(B $\Rightarrow$ {\ec �$B3d$C$?M>$j�(B}�$B$KCmL\�(B |
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\item �$B%3%s%T%e!<%?$O�(B{\eec �$B7+$jJV$7�(B}�$B$,F@0U�(B |
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�$B6a;w$r7+$jJV$7$F@:EY$r>e$2$k�(B |
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\end{itemize} |
| \end{slide} |
\end{slide} |
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| \begin{slide}{} |
\begin{slide}{} |
| Line 211 $\Rightarrow$ {\ec �$B:,$rC5$9J}K!$OE,MQ:$Fq�(B} |
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| Line 219 $\Rightarrow$ {\ec �$B:,$rC5$9J}K!$OE,MQ:$Fq�(B} |
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| $h_1$ �$B$r8+$D$1$k�(B. |
$h_1$ �$B$r8+$D$1$k�(B. |
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| \item $f(x)-g_k(x)h_k(x)$ �$B$N78?t$,�(B $p^k$ �$B$G3d$j@Z$l$k$h$&$K�(B $g_k$, $h_k$ �$B$r�(B |
\item $f(x)-g_k(x)h_k(x)$ �$B$N78?t$,�(B $p^k$ �$B$G3d$j@Z$l$k$h$&$K�(B $g_k$, $h_k$ �$B$r�(B |
| �$B:n$C$F$$$/�(B ($k=1,2,\ldots$) |
�$B=g<!:n$C$F$$$/�(B ($k=2,3,\ldots$) |
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| \item $g_1$, $h_1$ �$B$,@52r$KBP1~$7$F$$$l$P�(B, �$BE,Ev$J�(B $k$ �$B$N$H$3$m$G$[$s$H$K3d$j@Z$l$k$@$m$&�(B. |
\item $g_1$, $h_1$ �$B$,@52r$KBP1~$7$F$$$l$P�(B, �$BE,Ev$J�(B $k$ �$B$N$H$3$m$G$[$s$H$K3d$j@Z$l$k$@$m$&�(B. |
| \end{enumerate}} |
\end{enumerate}} |
| Line 238 $h_1$ �$B$r8+$D$1$k�(B. |
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| Line 246 $h_1$ �$B$r8+$D$1$k�(B. |
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| \begin{slide}{} |
\begin{slide}{} |
| \underline{\uc �$B5-9f�(B $a \equiv b \bmod M$} |
\underline{\uc �$B5-9f�(B $a \equiv b \bmod M$} |
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| $M$ �$B$r@0?t$H$9$k�(B. {\eec $a \equiv b \bmod M$} �$B$H$O�(B |
$M$ �$B$r@0?t$H$9$k�(B. |
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| \begin{itemize} |
\begin{itemize} |
| \item $a,b$ �$B$,@0?t$N$H$-�(B, |
\item $a,b$ �$B$,@0?t$N$H$-�(B, |
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| {\eec $a-b$ �$B$,�(B $M$ �$B$G3d$j@Z$l$k�(B}�$B$3$H�(B |
{\eec $a \equiv b \bmod M$} $\Leftrightarrow$ |
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{\eec $a-b$ �$B$,�(B $M$ �$B$G3d$j@Z$l$k�(B} |
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| \item $a,b$ �$B$,@0?t78?tB?9`<0$N$H$-�(B |
\item $a,b$ �$B$,@0?t78?tB?9`<0$N$H$-�(B |
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| {\eec $a-b$ �$B$N3F78?t$,�(B $M$ �$B$G3d$j@Z$l$k�(B}�$B$3$H�(B |
{\eec $a \equiv b \bmod M$} $\Leftrightarrow$ |
| \end{itemize} |
{\eec $a-b$ �$B$N3F78?t$,�(B $M$ �$B$G3d$j@Z$l$k�(B} |
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\item {\eec $a$ �$B$r�(B $M$ �$B$G3d$C$?M>$j�(B} �$B$b�(B {\eec $a \bmod M$} �$B$H=q$/�(B |
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| \underline{\uc $a$ �$B$r�(B $M$ �$B$G3d$C$?M>$j$b�(B $a \bmod M$ �$B$H=q$/�(B} |
\item $\equiv$ �$B$G7k$P$l$?<0�(B : {\eec �$BEy<0$HF1MM$K07$($k�(B} |
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\end{itemize} |
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| \end{slide} |
\end{slide} |
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| \begin{slide}{} |
\begin{slide}{} |
| Line 321 $q$, $r$, $s$, $t$ �$B$K�(B 0, 1, 2 �$B$NCM$rF~$l$F$_$ |
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| Line 332 $q$, $r$, $s$, $t$ �$B$K�(B 0, 1, 2 �$B$NCM$rF~$l$F$_$ |
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| {\eec $(q,r,s,t) = (0,1,1,2), (1,2,0,1)$} |
{\eec $(q,r,s,t) = (0,1,1,2), (1,2,0,1)$} |
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| �$B0lJ}$,�(B $b_0$, �$BB>J}$,�(B $c_0$ $\Rightarrow$ �$B$3$l$i$OF1$8$b$N�(B |
($b_0$,$c_0$) �$B$N%Z%"$H$7$F$O$3$l$i$OF1$8$b$N�(B |
| \end{slide} |
\end{slide} |
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| \begin{slide}{} |
\begin{slide}{} |
| \underline{\uc �$BFs<!0x;R$D$E$-�(B --- $b_1$, $c_1$ �$B$,K~$?$9@-<A�(B} |
\underline{\uc �$BFs<!0x;R$D$E$-�(B --- $b_1$, $c_1$ �$B$,K~$?$9>r7o�(B} |
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| {\Large\parskip 0pt |
{\Large\parskip 0pt |
| {\eec $b_0 = x^2+1$}, |
{\eec $b_0 = x^2+1$}, |
| {\eec $c_0 = x^2+x+2$} �$B$H$9$k$H�(B |
{\eec $c_0 = x^2+x+2$} �$B$H$9$k$H�(B |
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| \centerline{\eec $f-b_0c_0 \equiv 0 \bmod 3$} |
\centerline{\eec $f \equiv b_0c_0 \bmod 3$} |
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| $f-gh \equiv a_0-b_0c_0+p(a_1-$ |
$gh \equiv (b_0+3${\ec $b_1$}$)(c_0+3${\ec$c_1$}$) \bmod 3^2$ �$B$h$j�(B |
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$f-gh \equiv a_0-b_0c_0+3(a_1-$ |
| $(b_0${\ec$c_1$}$+c_0${\ec$b_1$}$))\bmod 3^2$ |
$(b_0${\ec$c_1$}$+c_0${\ec$b_1$}$))\bmod 3^2$ |
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| �$B$h$j�(B, �$BN>JU$r�(B 3 �$B$G3d$C$F�(B |
�$BN>JU$r�(B 3 �$B$G3d$C$F�(B |
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| ${{f-gh}\over 3} \equiv {{a_0-b_0c_0}\over 3}+(a_1-$ |
${{f-gh}\over 3} \equiv {{a_0-b_0c_0}\over 3}+(a_1-$ |
| $(b_0${\ec$c_1$}$+c_0${\ec$b_1$}$))\bmod 3$ |
$(b_0${\ec$c_1$}$+c_0${\ec$b_1$}$))\bmod 3$ |
| Line 386 $2r+t \equiv 0 \bmod 3$} |
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| Line 399 $2r+t \equiv 0 \bmod 3$} |
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| �$B0J2<F1MM$K�(B, |
�$B0J2<F1MM$K�(B, |
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| \centerline{\ec $b_k = qx+r, c_k = sx+t$} |
\centerline{\ec $b_i = qx+r, c_i = sx+t$} |
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| �$B$H$*$$$F�(B, $(q,r,s,t)$ �$B$NO"N)0l<!J}Dx<0$r2r$1$P�(B |
($i=2,3,\ldots$) �$B$H$*$$$F�(B, $(q,r,s,t)$ �$B$NO"N)0l<!J}Dx<0$r=g<!�(B |
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�$B2r$$$F$$$1$P�(B |
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| \centerline{\eec $f \equiv (b_0+\ldots+3^{k-1}b_{k-1})(c_0+\ldots+3^{k-1}c_{k-1}) \bmod 3^k$} |
\centerline{\eec $f \equiv (b_0+\ldots+3^{k-1}b_{k-1})(c_0+\ldots+3^{k-1}c_{k-1}) \bmod 3^k$} |
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| Line 427 $k$ & $g_k$ & $h_k$ \\ \hline |
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| Line 441 $k$ & $g_k$ & $h_k$ \\ \hline |
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| �$BI=$G8+$k$H�(B, {\eec $k=12 \rightarrow 13$ �$B$GJQ2=$,$J$$�(B} |
�$BI=$G8+$k$H�(B, {\eec $k=12 \rightarrow 13$ �$B$GJQ2=$,$J$$�(B} |
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| $\Rightarrow$ {\ec $f-g_{13}h_{13}$ �$B$r7W;;$7$F$_$k$H�(B 0!} |
$\Rightarrow$ {\ec $f-g_{13}h_{13}$ �$B$r7W;;$7$F$_$k$H�(B 0} |
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| {\eec |
{\eec |
| $f(x) = (x^2+7821x+89347) \times$ |
$f(x) =$ |
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| $(x^2+9235x+342527)$} |
$ (x^2+7821x+89347)(x^2+9235x+342527)$} |
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| \underline{\uc �$B<B:]$K$O�(B...} |
\underline{\uc �$B<B:]$K$O�(B...} |
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| Line 444 $(x^2+9235x+342527)$} |
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| Line 458 $(x^2+9235x+342527)$} |
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| \end{slide} |
\end{slide} |
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| \begin{slide}{} |
\begin{slide}{} |
| \underline{\uc $\bmod p$ �$B$G$NJ,2r$,0lHVBg@Z�(B} |
\underline{\uc $\bmod p$ �$B$G$NJ,2r$,LdBj�(B} |
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| �$B3F%9%F%C%W$G=P$FMh$k78?t$NJ}Dx<0�(B |
�$B3F%9%F%C%W$G=P$FMh$k78?t$NJ}Dx<0�(B |
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| Line 586 $\Rightarrow$ �$B7W;;5!$N%Q%o!<$@$1$G$O%@%a�(B. |
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| Line 600 $\Rightarrow$ �$B7W;;5!$N%Q%o!<$@$1$G$O%@%a�(B. |
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| \begin{enumerate} |
\begin{enumerate} |
| \item $0 < s_A < p$ �$B$J$k@0?t�(B {\eec $s_A$} (�$BHkL)�(B) �$B$r:n$k�(B. |
\item $0 < s_A < p$ �$B$J$k@0?t�(B {\eec $s_A$} (�$BHkL)�(B) �$B$r:n$k�(B. |
| \item $w_A =$ {\eec $g^{s_A} \bmod p$} �$B$r�(B B �$B$5$s$KAw$k�(B. |
\item $w_A =$ {\eec $g^{s_A} \bmod p$} �$B$r�(B B �$B$5$s$KAw$k�(B. |
| \item $s =$ {\eec $w_B^{s_A} \bmod p$} �$B$r:n$k�(B. |
\item �$B<u$1<h$C$?�(B $w_B$ �$B$+$i�(B $s =$ {\eec $w_B^{s_A} \bmod p$} �$B$r:n$k�(B. |
| \end{enumerate} |
\end{enumerate} |
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| \item {\eec B �$B$5$s$N;E;v�(B} |
\item {\eec B �$B$5$s$N;E;v�(B} |
| Line 594 $\Rightarrow$ �$B7W;;5!$N%Q%o!<$@$1$G$O%@%a�(B. |
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| Line 608 $\Rightarrow$ �$B7W;;5!$N%Q%o!<$@$1$G$O%@%a�(B. |
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| \begin{enumerate} |
\begin{enumerate} |
| \item $0 < s_B < p$ �$B$J$k@0?t�(B {\eec $s_B$} (�$BHkL)�(B) �$B$r:n$k�(B. |
\item $0 < s_B < p$ �$B$J$k@0?t�(B {\eec $s_B$} (�$BHkL)�(B) �$B$r:n$k�(B. |
| \item $w_B =$ {\eec $g^{s_B} \bmod p$} �$B$r�(B A �$B$5$s$KAw$k�(B. |
\item $w_B =$ {\eec $g^{s_B} \bmod p$} �$B$r�(B A �$B$5$s$KAw$k�(B. |
| \item $s =$ {\eec $w_A^{s_B} \bmod p$} �$B$r:n$k�(B. |
\item �$B<u$1<h$C$?�(B $w_A$ �$B$+$i�(B $s =$ {\eec $w_A^{s_B} \bmod p$} �$B$r:n$k�(B. |
| \end{enumerate} |
\end{enumerate} |
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| \end{itemize}} |
\end{itemize}} |
| Line 608 $\Rightarrow$ �$B7W;;5!$N%Q%o!<$@$1$G$O%@%a�(B. |
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| Line 622 $\Rightarrow$ �$B7W;;5!$N%Q%o!<$@$1$G$O%@%a�(B. |
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| �$B$3$l$G80$,6&M-$G$-$?�(B |
�$B$3$l$G80$,6&M-$G$-$?�(B |
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| \item {\eec $w_A$, $w_B$ �$B$O0E9f2=$5$l$J$$�(B} |
\item {\eec $w_A$, $w_B$ �$B$O0E9f2=$NI,MW$J$7�(B} |
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| $g^{s_A} \bmod p$ �$B$+$i�(B $s_A$ �$B$r5a$a$k$N$OFq$7$$�(B |
$g^{s_A} \bmod p$ �$B$+$i�(B $s_A$ �$B$r5a$a$k$N$OFq$7$$�(B |
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