version 1.65, 1999/12/23 22:58:32 |
version 1.74, 1999/12/24 16:59:48 |
|
|
\documentclass{jarticle} |
\documentclass{jarticle} |
|
|
%% $OpenXM: OpenXM/doc/genkou19991125.tex,v 1.64 1999/12/23 22:04:16 tam Exp $ |
%% $OpenXM: OpenXM/doc/genkou19991125.tex,v 1.73 1999/12/24 15:42:24 ohara Exp $ |
|
|
\usepackage{jssac} |
\usepackage{jssac} |
\title{¥¿¥¤¤Î¥È¥ë} |
\title{ |
\title{°ÕÌ£¤â¤Ê¤¤½¤¾þ²á¾ê¤Ê¸ì¶ç¤ÏÇÓ½ü¤·¤Þ¤·¤ç¤¦¡£} |
1. °ÕÌ£¤â¤Ê¤¤½¤¾þ²á¾ê¤Ê¸ì¶ç¤ÏÇÓ½ü¤·¤Þ¤·¤ç¤¦¡£\\ |
|
3. ¤»¤Ã¤«¤¯ fill ¤·¤Æ¤¤¤ë¤Î¤ò¤¤¤¸¤é¤Ê¤¤¤Ç¤¯¤ì¡£\\ |
|
4. Åļ¤¬Í·¤ó¤Ç¤Ð¤«¤ê¤Ç¤ª¤ì¤Ð¤«¤ê»Å»ö¤ò¤·¤Æ¤¤¤ë¤Î¤Ï¤É¤¦¹Í¤¨¤Æ¤âÉÔ¸øÊ¿¤À¡£ |
|
¤Ê¤ó¤Ç»Å»ö¤ò¤·¤Ê¤¤¤Î¤«¡¢¤¤¤¤²Ã¸º»Å»ö¤ò¤·¤í¡¢Åļ¡£ |
|
%¢¬¤¹¤ß¤Þ¤»¤ó¡¢²È¤Ç¸æÈÓ¿©¤Ù¤Æ¤Þ¤·¤¿¡£ |
|
} |
|
|
\author{Á° Àî ¾ ½¨\affil{¿À¸ÍÂç³ØÍý³ØÉô} |
\author{±ü ë ¡¡ ¹Ô ±û\affil{¿À¸ÍÂç³ØÂç³Ø±¡¼«Á³²Ê³Ø¸¦µæ²Ê} |
\mail{maekawa@math.sci.kobe-u.ac.jp} |
|
\and Ìî Ϥ Àµ ¹Ô\affil{ÉÙ»ÎÄ̸¦µæ½ê} |
|
\mail{noro@para.flab.fujitsu.co.jp} |
|
\and ¾® ¸¶ ¸ù Ǥ\affil{¶âÂôÂç³ØÍý³ØÉô} |
|
\mail{ohara@kappa.s.kanazawa-u.ac.jp} |
|
\and ±ü ë ¹Ô ±û\affil{¿À¸ÍÂç³ØÂç³Ø±¡¼«Á³²Ê³Ø¸¦µæ²Ê} |
|
\mail{okutani@math.sci.kobe-u.ac.jp} |
\mail{okutani@math.sci.kobe-u.ac.jp} |
\and ¹â »³ ¿® µ£\affil{¿À¸ÍÂç³ØÍý³ØÉô} |
\and ¾® ¸¶ ¡¡ ¸ù Ǥ\affil{¶âÂôÂç³ØÍý³ØÉô} |
|
\mail{ohara@kappa.s.kanazawa-u.ac.jp} |
|
\and ¹â »³ ¡¡ ¿® µ£\affil{¿À¸ÍÂç³ØÍý³ØÉô} |
\mail{takayama@math.sci.kobe-u.ac.jp} |
\mail{takayama@math.sci.kobe-u.ac.jp} |
\and ÅÄ Â¼ ¶³ »Î\affil{¿À¸ÍÂç³ØÂç³Ø±¡¼«Á³²Ê³Ø¸¦µæ²Ê} |
\and ÅÄ Â¼ ¡¡ ¶³ »Î\affil{¿À¸ÍÂç³ØÂç³Ø±¡¼«Á³²Ê³Ø¸¦µæ²Ê} |
\mail{tamura@math.sci.kobe-u.ac.jp} |
\mail{tamura@math.sci.kobe-u.ac.jp} |
|
\and Ìî Ϥ ¡¡ Àµ ¹Ô\affil{ÉÙ»ÎÄ̸¦µæ½ê} |
|
\mail{noro@para.flab.fujitsu.co.jp} |
|
\and Á° Àî ¡¡ ¾ ½¨\affil{¿À¸ÍÂç³ØÍý³ØÉô} |
|
\mail{maekawa@math.sci.kobe-u.ac.jp} |
} |
} |
\art{} |
\art{} |
|
|
Line 34 OpenXM ¤Ï¿ô³Ø¥×¥í¥»¥¹´Ö¤Ç¥á¥Ã¥»¡¼¥¸¤ò¸ò´¹¤¹¤ë¤¿¤á¤Îµ¬Ì |
|
Line 39 OpenXM ¤Ï¿ô³Ø¥×¥í¥»¥¹´Ö¤Ç¥á¥Ã¥»¡¼¥¸¤ò¸ò´¹¤¹¤ë¤¿¤á¤Îµ¬Ì |
|
OpenXM ¤Î³«È¯¤Îȯü¤ÏÌîϤ¤È¹â»³¤Ë¤è¤ê¡¢ |
OpenXM ¤Î³«È¯¤Îȯü¤ÏÌîϤ¤È¹â»³¤Ë¤è¤ê¡¢ |
asir ¤È kan/sm1 ¤òÁê¸ß¤Ë¸Æ¤Ó½Ð¤¹µ¡Ç½¤ò¼ÂÁõ¤·¤¿¤³¤È¤Ç¤¢¤ë¡£ |
asir ¤È kan/sm1 ¤òÁê¸ß¤Ë¸Æ¤Ó½Ð¤¹µ¡Ç½¤ò¼ÂÁõ¤·¤¿¤³¤È¤Ç¤¢¤ë¡£ |
|
|
%{\bf\large °Ê²¼¤ÎÀâÌÀ¤¬¤Ê¤¼É¬ÍפʤΤ«¤ÏÁ´Á³Ê¬¤«¤é¤Ê¤¤¤±¤ì¤É¡¢} |
|
½é´ü¤Î¼ÂÁõ¤Ç¤Ï¡¢Áê¼ê¦¤Î¥í¡¼¥«¥ë¸À¸ì¤Îʸˡ¤Ë½¾¤Ã¤¿Ê¸»úÎó¤òÁ÷¤Ã¤Æ¤¤¤¿¡£ |
½é´ü¤Î¼ÂÁõ¤Ç¤Ï¡¢Áê¼ê¦¤Î¥í¡¼¥«¥ë¸À¸ì¤Îʸˡ¤Ë½¾¤Ã¤¿Ê¸»úÎó¤òÁ÷¤Ã¤Æ¤¤¤¿¡£ |
¤³¤ÎÊýË¡¤Ç¤ÏÁê¼ê¦¤Î¥½¥Õ¥È¤¬ asir ¤Ê¤Î¤« kan/sm1 ¤Ê¤Î¤«¤òȽÊ̤¹¤ë¤Ê¤É¤·¤Æ¡¢ |
¤³¤ÎÊýË¡¤Ç¤ÏÁê¼ê¦¤Î¥½¥Õ¥È¤¬ asir ¤Ê¤Î¤« kan/sm1 ¤Ê¤Î¤«¤òȽÊ̤¹¤ë¤Ê¤É¤·¤Æ¡¢ |
Áê¼ê¦¤Î¥í¡¼¥«¥ë¸À¸ì¤Îʸˡ¤Ë¹ç¤ï¤»¤¿Ê¸»úÎó¤òºîÀ®¤·¤Ê¤±¤ì¤Ð¤Ê¤é¤Ê¤¤¡£ |
Áê¼ê¦¤Î¥í¡¼¥«¥ë¸À¸ì¤Îʸˡ¤Ë¹ç¤ï¤»¤¿Ê¸»úÎó¤òºîÀ®¤·¤Ê¤±¤ì¤Ð¤Ê¤é¤Ê¤¤¡£ |
Line 45 asir ¤È kan/sm1 ¤òÁê¸ß¤Ë¸Æ¤Ó½Ð¤¹µ¡Ç½¤ò¼ÂÁõ¤·¤¿¤³¤È¤Ç¤¢ |
|
Line 49 asir ¤È kan/sm1 ¤òÁê¸ß¤Ë¸Æ¤Ó½Ð¤¹µ¡Ç½¤ò¼ÂÁõ¤·¤¿¤³¤È¤Ç¤¢ |
|
¾åµ¤Îʸ»úÎó¤òÁ÷¤ëÊýË¡¤ÎÍøÅÀ¤òÀ¸¤«¤¹¤¿¤á¡¢ |
¾åµ¤Îʸ»úÎó¤òÁ÷¤ëÊýË¡¤ÎÍøÅÀ¤òÀ¸¤«¤¹¤¿¤á¡¢ |
OpenXM µ¬Ìó¤Ç¤Ï¶¦ÄÌɽ¸½·Á¼°¤ÎÃæ¤Îʸ»úÎó¤È¤·¤Æ¡¢ |
OpenXM µ¬Ìó¤Ç¤Ï¶¦ÄÌɽ¸½·Á¼°¤ÎÃæ¤Îʸ»úÎó¤È¤·¤Æ¡¢ |
¥í¡¼¥«¥ë¸À¸ì¤Îʸˡ¤Ë½¾¤Ã¤¿Ê¸»úÎó¤òÍѤ¤¤¿¥á¥Ã¥»¡¼¥¸¤Î¸ò´¹¤â²Äǽ¤È¤Ê¤Ã¤Æ¤¤¤ë¡£ |
¥í¡¼¥«¥ë¸À¸ì¤Îʸˡ¤Ë½¾¤Ã¤¿Ê¸»úÎó¤òÍѤ¤¤¿¥á¥Ã¥»¡¼¥¸¤Î¸ò´¹¤â²Äǽ¤È¤Ê¤Ã¤Æ¤¤¤ë¡£ |
%{\large\bf ¤·¤«¤·¡¢¤³¤ó¤ÊºÙ¤«¤¤¤³¤È¤ò¤³¤³¤ÇÀâÌÀ¤·¤Ê¤±¤ì¤Ð |
|
%¤Ê¤é¤Ê¤¤Íýͳ¤¬¤ä¤Ã¤Ñ¤êʬ¤«¤é¤Ê¤¤¤Ê¤¡¡£¹½À®Åª¤Ë¤ª¤«¤·¤¤¤È»×¤¦¤±¤É¤Ê¤¡¡£°Õ |
|
%Ì£ÉÔÌÀ¡£} |
|
|
|
OpenXM µ¬Ìó¤Ç¤ÏÄÌ¿®¤ÎÊýË¡¤Ë´ö¤é¤«¤Î¼«Í³ÅÙ¤¬¤¢¤ë¤¬¡¢ |
OpenXM µ¬Ìó¤Ç¤ÏÄÌ¿®¤ÎÊýË¡¤Ë´ö¤é¤«¤Î¼«Í³ÅÙ¤¬¤¢¤ë¤¬¡¢ |
¸½ºß¤Î¤È¤³¤í¤Ï TCP/IP ¤òÍѤ¤¤¿ÄÌ¿®¤·¤«¼ÂÁõ¤µ¤ì¤Æ¤¤¤Ê¤¤¡£ |
¸½ºß¤Î¤È¤³¤í¤Ï TCP/IP ¤òÍѤ¤¤¿ÄÌ¿®¤·¤«¼ÂÁõ¤µ¤ì¤Æ¤¤¤Ê¤¤¡£ |
Line 95 OpenXM µ¬Ìó¤Çµ¬Äꤵ¤ì¤Æ¤¤¤ë¥á¥Ã¥»¡¼¥¸¤Ï¥Ð¥¤¥È¥¹¥È¥ê¡¼¥ |
|
Line 96 OpenXM µ¬Ìó¤Çµ¬Äꤵ¤ì¤Æ¤¤¤ë¥á¥Ã¥»¡¼¥¸¤Ï¥Ð¥¤¥È¥¹¥È¥ê¡¼¥ |
|
\end{verbatim} |
\end{verbatim} |
|
|
¥Ü¥Ç¥£¤Î¹½Â¤¤Ï¥á¥Ã¥»¡¼¥¸¤Î¼ïÎà¤Ë¤è¤Ã¤Æ°Û¤Ê¤ë¡£ |
¥Ü¥Ç¥£¤Î¹½Â¤¤Ï¥á¥Ã¥»¡¼¥¸¤Î¼ïÎà¤Ë¤è¤Ã¤Æ°Û¤Ê¤ë¡£ |
¤³¤ÎÏÀʸ¤Ç¤Ï OX\_DATA ¤È OX\_COMMAND ¤Ç¼±Ê̤µ¤ì¤ë¥á¥Ã¥»¡¼¥¸¤Ë¤Ä¤¤¤Æ¤Î¤ß¡¢ |
¥¿¥°¤¬ OX\_COMMAND ¤È¤Ê¤Ã¤Æ¤¤¤ë¥á¥Ã¥»¡¼¥¸¤Ï¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤Ø¤ÎÌ¿Îá¤Ç¤¢¤ê¡¢ |
ÀâÌÀ¤¹¤ë¡£ |
¤½¤ì°Ê³°¤Î¥á¥Ã¥»¡¼¥¸¤Ï²¿¤é¤«¤Î¥ª¥Ö¥¸¥§¥¯¥È¤òɽ¤·¤Æ¤¤¤ë¡£ |
|
¤³¤ÎÏÀʸ¤Ç¤Ï OX\_DATA ¤È OX\_COMMAND ¤Ç¼±Ê̤µ¤ì¤ë |
|
¥á¥Ã¥»¡¼¥¸¤Ë¤Ä¤¤¤Æ¤Î¤ß¡¢ÀâÌÀ¤¹¤ë¡£ |
|
|
´û¸¤Î¥á¥Ã¥»¡¼¥¸¤Ç¤ÏÂбþ¤Ç¤¤Ê¤¤¾ì¹ç¤Ï¡¢¿·¤·¤¤¼±Ê̻ҤòÄêµÁ¤¹¤ë¤³¤È¤Ç¿·¤· |
´û¸¤Î¥á¥Ã¥»¡¼¥¸¤Ç¤ÏÂбþ¤Ç¤¤Ê¤¤¾ì¹ç¤Ï¡¢¿·¤·¤¤¼±Ê̻ҤòÄêµÁ¤¹¤ë¤³¤È¤Ç¿·¤· |
¤¤¼ïÎà¤Î¥á¥Ã¥»¡¼¥¸¤òºîÀ®¤¹¤ë¤³¤È¤¬¤Ç¤¤ë¡£¤³¤ÎÊýË¡¤Ï³Æ¿ô³Ø¥½¥Õ¥È¥¦¥§¥¢¤Î |
¤¤¼ïÎà¤Î¥á¥Ã¥»¡¼¥¸¤òºîÀ®¤¹¤ë¤³¤È¤¬¤Ç¤¤ë¡£¤³¤ÎÊýË¡¤Ï³Æ¿ô³Ø¥½¥Õ¥È¥¦¥§¥¢¤Î |
Line 109 OpenXM µ¬Ìó¤Ç¤Î·×»»¤È¤Ï¥á¥Ã¥»¡¼¥¸¤ò¸ò´¹¤¹¤ë¤³¤È¤Ç¤¢¤ë¡ |
|
Line 112 OpenXM µ¬Ìó¤Ç¤Î·×»»¤È¤Ï¥á¥Ã¥»¡¼¥¸¤ò¸ò´¹¤¹¤ë¤³¤È¤Ç¤¢¤ë¡ |
|
Ìó¤Ç¤Ï¥¯¥é¥¤¥¢¥ó¥È¡¦¥µ¡¼¥Ð¥â¥Ç¥ë¤òºÎÍѤ·¤Æ¤¤¤ë¤Î¤Ç¡¢¥á¥Ã¥»¡¼¥¸¤Î¸ò´¹¤Ï¥µ¡¼ |
Ìó¤Ç¤Ï¥¯¥é¥¤¥¢¥ó¥È¡¦¥µ¡¼¥Ð¥â¥Ç¥ë¤òºÎÍѤ·¤Æ¤¤¤ë¤Î¤Ç¡¢¥á¥Ã¥»¡¼¥¸¤Î¸ò´¹¤Ï¥µ¡¼ |
¥Ð¤È¥¯¥é¥¤¥¢¥ó¥È¤Î´Ö¤Ç¹Ô¤Ê¤ï¤ì¤ë¡£¥¯¥é¥¤¥¢¥ó¥È¤«¤é¥µ¡¼¥Ð¤Ø¥á¥Ã¥»¡¼¥¸¤òÁ÷ |
¥Ð¤È¥¯¥é¥¤¥¢¥ó¥È¤Î´Ö¤Ç¹Ô¤Ê¤ï¤ì¤ë¡£¥¯¥é¥¤¥¢¥ó¥È¤«¤é¥µ¡¼¥Ð¤Ø¥á¥Ã¥»¡¼¥¸¤òÁ÷ |
¤ê¡¢¥¯¥é¥¤¥¢¥ó¥È¤¬¥µ¡¼¥Ð¤«¤é¥á¥Ã¥»¡¼¥¸¤ò¼õ¤±¼è¤ë¤³¤È¤Ë¤è¤Ã¤Æ·×»»¤Î·ë²Ì¤¬ |
¤ê¡¢¥¯¥é¥¤¥¢¥ó¥È¤¬¥µ¡¼¥Ð¤«¤é¥á¥Ã¥»¡¼¥¸¤ò¼õ¤±¼è¤ë¤³¤È¤Ë¤è¤Ã¤Æ·×»»¤Î·ë²Ì¤¬ |
ÆÀ¤é¤ì¤ë¡£ |
ÆÀ¤é¤ì¤ë¡£¤³¤Î¥á¥Ã¥»¡¼¥¸¤Î¤ä¤ê¤È¤ê¤Ï¥¯¥é¥¤¥¢¥ó¥È¤Î¼çƳ¤Ç¹Ô¤ï¤ì¤ë¡£¤Ä¤Þ¤ê¡¢ |
|
¥¯¥é¥¤¥¢¥ó¥È¤Ï¼«Í³¤Ë¥á¥Ã¥»¡¼¥¸¤ò¥µ¡¼¥Ð¤ËÁ÷ÉÕ¤·¤Æ¤â¤è¤¤¤¬¡¢¥µ¡¼¥Ð¤«¤é¤Ï¼« |
|
ȯŪ¤Ë¥á¥Ã¥»¡¼¥¸¤¬Á÷ÉÕ¤µ¤ì¤ë¤³¤È¤Ï¤Ê¤¤¡£¤³¤Î¸¶Íý¤Ï¥µ¡¼¥Ð¤Ï¥¹¥¿¥Ã¥¯¥Þ¥·¥ó |
|
¤Ç¤¢¤ë¤³¤È¤Ç¼Â¸½¤µ¤ì¤ë¡£¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤Î¹½Â¤¤Ë¤Ä¤¤¤Æ¤Ï \ref{sec:oxsm} Àá |
|
¤Ç½Ò¤Ù¤ë¡£ |
|
|
¥µ¡¼¥Ð¤Ï¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤Ç¤¢¤ë¡£¥µ¡¼¥Ð¤¬¥¯¥é¥¤¥¢¥ó¥È¤«¤é¼õ¤±¼è¤Ã¤¿¥á¥Ã¥»¡¼ |
¥µ¡¼¥Ð¤¬¥¯¥é¥¤¥¢¥ó¥È¤«¤é¼õ¤±¼è¤Ã¤¿¥ª¥Ö¥¸¥§¥¯¥È(¤Ä¤Þ¤ê OX\_COMMAND ¤Ç¤Ê¤¤ |
¥¸¤Ï¡¢¥¿¥°¤¬ OX\_COMMAND ¤Ç¤Ê¤±¤ì¤Ð¤¹¤Ù¤Æ¥¹¥¿¥Ã¥¯¤ËÀѤޤì¤ë¡£¥¿¥°¤¬ |
¥á¥Ã¥»¡¼¥¸¤Î¥Ü¥Ç¥£)¤Ï¤¹¤Ù¤Æ¥¹¥¿¥Ã¥¯¤ËÀѤޤì¤ë¡£¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤Ø¤ÎÌ¿Îá |
OX\_COMMAND ¤È¤Ê¤Ã¤Æ¤¤¤ë¥á¥Ã¥»¡¼¥¸¤Ï¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤Ø¤ÎÌ¿Îá¤Ç¤¢¤ê¡¢¤³¤Î¥á¥Ã |
(OX\_COMMAND ¤Ç¼±Ê̤µ¤ì¤ë¥á¥Ã¥»¡¼¥¸¤Î¥Ü¥Ç¥£)¤ò¼õ¤±¼è¤Ã¤¿¥µ¡¼¥Ð¤ÏÌ¿Îá¤ËÂÐ |
¥»¡¼¥¸¤ò¼õ¤±¼è¤Ã¤¿¥µ¡¼¥Ð¤Ï¤½¤ì¤ËÂбþ¤¹¤ëÆ°ºî¤ò¹Ô¤Ê¤¦¤³¤È¤¬´üÂÔ¤µ¤ì¤Æ¤¤¤ë¡£ |
±þ¤¹¤ëÆ°ºî¤ò¹Ô¤Ê¤¦¡£¤³¤Î¤È¤¡¢Ì¿Îá¤Ë¤è¤Ã¤Æ¤Ï¥¹¥¿¥Ã¥¯¤«¤é¥ª¥Ö¥¸¥§¥¯¥È¤ò¼è |
|
¤ê½Ð¤¹¤³¤È¤¬¤¢¤ê¡¢¤Þ¤¿(³Æ¿ô³Ø¥·¥¹¥Æ¥à¤Ç¤Î)·×»»·ë²Ì¤ò¥¹¥¿¥Ã¥¯¤ËÀѤळ¤È¤¬ |
|
¤¢¤ë¡£¤â¤·¡¢Í¿¤¨¤é¤ì¤¿¥Ç¡¼¥¿¤¬Àµ¤·¤¯¤Ê¤¤¤Ê¤É¤ÎÍýͳ¤Ç¥¨¥é¡¼¤¬À¸¤¸¤¿¾ì¹ç¤Ë |
|
¤Ï¥µ¡¼¥Ð¤Ï¥¨¥é¡¼¥ª¥Ö¥¸¥§¥¯¥È¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ·×»»·ë²Ì¤ò¥¯¥é¥¤¥¢¥ó¥È¤¬ÆÀ |
|
¤ë¾ì¹ç¤Ë¤Ï¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤ÎÌ¿Îá SM\_popCMO ¤Þ¤¿¤Ï SM\_popString ¤ò¥µ¡¼¥Ð |
|
¤ËÁ÷¤é¤Ê¤±¤ì¤Ð¤Ê¤é¤Ê¤¤¡£¤³¤ì¤é¤ÎÌ¿Îá¤ò¼õ¤±¼è¤Ã¤Æ¤Ï¤¸¤á¤Æ¡¢¥µ¡¼¥Ð¤«¤é¥¯¥é |
|
¥¤¥¢¥ó¥È¤Ø¥á¥Ã¥»¡¼¥¸¤¬Á÷¤é¤ì¤ë¡£ |
|
|
%{\large\bf °ÕÌ£ÉÔÌÀ¤Ê½ñ¤Êý¤À¤±¤É¡¢} |
{\Huge °Ê²¼¡¢½ñ¤Ä¾¤·} |
¥µ¡¼¥Ð¤Ï¥á¥Ã¥»¡¼¥¸¤ò¼õ¤±¼è¤é¤Ê¤¤¸Â¤ê¡¢¼«¤é²¿¤«Æ°ºî¤ò¹Ô¤Ê¤ª¤¦¤È¤Ï¤·¤Ê¤¤¡£ |
|
¤³¤ì¤Ï¥¯¥é¥¤¥¢¥ó¥È¤¬Ëè²ó¥µ¡¼¥Ð¤Ø¥á¥Ã¥»¡¼¥¸¤òÁ÷¤ë¤¿¤Ó¤Ë¡¢ |
|
¤¤¤Ä¤â¥µ¡¼¥Ð¤«¤é¤Î¥á¥Ã¥»¡¼¥¸¤òÂÔ¤ÄɬÍפ¬¤Ê¤¤¤³¤È¤ò°ÕÌ£¤¹¤ë¡£ |
|
¤³¤Î¤¿¤á¡¢¥¯¥é¥¤¥¢¥ó¥È¤Ï¥µ¡¼¥Ð¤Î¾õÂÖ¤òµ¤¤Ë¤»¤º¤Ë¥á¥Ã¥»¡¼¥¸¤òÁ÷¤ê¡¢ |
|
°ìö¥á¥Ã¥»¡¼¥¸¤òÁ÷ÉÕ¤·½ª¤¨¤¿¸å¡¢ |
|
Á÷¤Ã¤¿¥á¥Ã¥»¡¼¥¸¤Î·ë²Ì¤ò¥µ¡¼¥Ð¤«¤éÂԤĤ³¤È¤Ê¤·¤Ë¼¡¤ÎÆ°ºî¤Ë°Ü¤ë¤³¤È¤¬¤Ç¤¤ë¡£ |
|
|
|
\section{OpenXM ¤Î·×»»¤Î¿Ê¹ÔÊýË¡} |
¤Þ¤È¤á¤ë¤È¡¢¥¯¥é¥¤¥¢¥ó¥È¤¬¥µ¡¼¥Ð¤Ø¥á¥Ã¥»¡¼¥¸¤òÁ÷¤ê¡¢ |
|
·×»»¤Î·ë²Ì¤òÆÀ¤ë¤È¤¤¤¦¼ê½ç¤Ï°Ê²¼¤Î¤è¤¦¤Ë¤Ê¤ë¡£ |
|
|
%Á°¤ÎÀá¤È½ÅÊ£¤·¤Æ¤¤¤ë¤Î¤Ç¤â¤¦¾¯¤·¤Á¤ã¤ó¤È¹Í¤¨¤ÆÍߤ·¤¤¤Î¤À¤±¤ì¤É¡¢ |
\begin{enumerate} |
|
\item |
|
¤Þ¤º¡¢¥¯¥é¥¤¥¢¥ó¥È¤¬¥µ¡¼¥Ð¤Ø¥ª¥Ö¥¸¥§¥¯¥È¤òÁ÷¤ë¡£¥µ¡¼¥Ð¤ÏÁ÷¤é¤ì¤Æ¤¤¿¥ª¥Ö |
|
¥¸¥§¥¯¥È¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
|
\item |
|
¥¯¥é¥¤¥¢¥ó¥È¤¬¥µ¡¼¥Ð¤ËÌ¿Îá¤òÁ÷¤ë¤È¡¢¥µ¡¼¥Ð¤ÏɬÍפʤÀ¤±¥¹¥¿¥Ã¥¯¤«¤é¥Ç¡¼¥¿ |
|
¤ò¼è¤ê½Ð¤·¡¢¼Â¹Ô¤·¤¿·ë²Ì¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
|
%¤Ã¤Æ½ñ¤¤¤Æ¤ë¤±¤É¡¢Ì¿Î᤬SM\_popCMO ¤È¤« SM\_shutdown ¤Î¾ì¹ç¤Ï? |
|
\item |
|
ºÇ¸å¤Ë SM\_popCMO ¤â¤·¤¯¤Ï SM\_popString ¤ò¥µ¡¼¥Ð¤ØÁ÷¤ë¤È¡¢ |
|
¥µ¡¼¥Ð¤Ï¥¹¥¿¥Ã¥¯¤«¤é·×»»·ë²Ì¤ÎÆþ¤Ã¤Æ¤¤¤ë¥Ç¡¼¥¿¤ò¼è¤ê½Ð¤·¡¢ |
|
¥¯¥é¥¤¥¢¥ó¥È¤ØÁ÷½Ð¤¹¤ë¡£ |
|
\end{enumerate} |
|
|
%¥µ¡¼¥Ð¤¬¹Ô¤¦¤Î¤Ï´ðËÜŪ¤Ë¼¡¤Î»öÊÁ¤À¤±¤Ç¤¢¤ë¡£ |
\section{OpenXM ¥¹¥¿¥Ã¥¯¥Þ¥·¥ó}\label{sec:oxsm} |
%¥¯¥é¥¤¥¢¥ó¥È¤«¤é¥á¥Ã¥»¡¼¥¸¤ò¼õ¤±¼è¤ë¤È¡¢ |
|
%¥µ¡¼¥Ð¤Ï¤Þ¤º¥á¥Ã¥»¡¼¥¸¤Î¼±Ê̻ҤòÄ´¤Ù¡¢ |
|
%¥¿¥°¤¬ OX\_COMMAND ¤Î¥á¥Ã¥»¡¼¥¸¤Ç¤Ê¤±¤ì¤Ð¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
|
%¥¿¥°¤¬ OX\_COMMAND ¤Î¥á¥Ã¥»¡¼¥¸¤Ç¤¢¤ì¤Ð¥á¥Ã¥»¡¼¥¸¤Î¥Ü¥Ç¥£¤«¤é |
|
%¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤ÎÌ¿Îᥳ¡¼¥É¤ò¼è¤ê¤À¤·¡¢ |
|
%¤¢¤é¤«¤¸¤áµ¬Ìó¤ÇÄê¤á¤é¤ì¤¿Æ°ºî¤ò¹Ô¤Ê¤¦¡£ |
|
|
|
Á°Àá¤ÎÀâÌÀ¤Ç¤ï¤«¤ë¤è¤¦¤Ë¡¢ |
OpenXM µ¬Ìó¤Ç¤Ï¥µ¡¼¥Ð¤Ï¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤Ç¤¢¤ë¤ÈÄêµÁ¤·¤Æ¤¤¤ë¡£°Ê²¼¡¢OpenXM |
¥µ¡¼¥Ð¤Ï¥¯¥é¥¤¥¢¥ó¥È¤«¤é¤Î»Ø¼¨¤Ê¤·¤Ë¡¢ |
¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤È¸Æ¤Ö¡£¤³¤ÎÀá¤Ç¤ÏOpenXM ¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤Î¹½Â¤¤Ë¤Ä¤¤¤ÆÀâÌÀ |
¼«¤é¥á¥Ã¥»¡¼¥¸¤òÁ÷¤é¤Ê¤¤¡£ |
¤·¤è¤¦¡£ |
%(Îã³°? ox\_asir ¤Î mathcap)¡£ |
|
|
|
¥µ¡¼¥Ð¤¬¥¯¥é¥¤¥¢¥ó¥È¤«¤é¼õ¤±¼è¤Ã¤¿¥á¥Ã¥»¡¼¥¸¤Ï¤¹¤Ù¤Æ¥¹¥¿¥Ã¥¯¤ËÀѤޤì¤Æ¤¤¤ë¡£ |
¤Þ¤º¡¢OpenXM µ¬Ìó¤ÏÄÌ¿®»þ¤Ë¤ä¤ê¤È¤ê¤µ¤ì¤ë¶¦Ä̤Υǡ¼¥¿·Á¼°¤Ë¤Ä¤¤¤Æ¤Ïµ¬Äê |
¼¡¤¤¤Ç¥µ¡¼¥Ð¤Ë¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤Ø¤ÎÌ¿Îá¤òÁ÷¤ë¤È¡¢ |
¤¹¤ë¤¬¡¢OpenXM ¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤¬¥¹¥¿¥Ã¥¯¤ËÀѤࡢ¥ª¥Ö¥¸¥§¥¯¥È¤Î¹½Â¤¤Þ¤Ç¤Ï |
½é¤á¤Æ¥µ¡¼¥Ð¤Ï¥Ç¡¼¥¿¤ò¥¹¥¿¥Ã¥¯¤ËÀѤà°Ê³°¤Î¤Ê¤ó¤é¤«¤ÎÆ°ºî¤ò¹Ô¤Ê¤¦¡£ |
µ¬Äꤷ¤Ê¤¤¡£¤Ä¤Þ¤ê¡¢¥ª¥Ö¥¸¥§¥¯¥È¤Î¹½Â¤¤Ï³Æ¿ô³Ø¥·¥¹¥Æ¥à¤´¤È¤Ë°Û¤Ê¤Ã¤Æ¤¤¤ë |
¤³¤Î¤È¤¡¢É¬Íפ¬¤¢¤ì¤Ð¥µ¡¼¥Ð¤Ï¥¹¥¿¥Ã¥¯¤«¤éɬÍפʤÀ¤±¥Ç¡¼¥¿¤ò¼è¤ê½Ð¤¹¡£ |
¤È¤¤¤¦¤³¤È¤Ç¤¢¤ë¡£¤³¤Î¤³¤È¤ÏÄÌ¿®Ï©¤«¤é¥Ç¡¼¥¿¤ò¼õ¤±¼è¤Ã¤¿ºÝ¤Ë¡¢³Æ¿ô³Ø¥·¥¹ |
¤³¤³¤Ç¡¢¥¯¥é¥¤¥¢¥ó¥È¤«¤é¤ÎÌ¿Îá¤Ë¤è¤ëÆ°ºîÃæ¤Ë¤¿¤È¤¨¥¨¥é¡¼¤¬È¯À¸¤·¤¿¤È¤·¤Æ¤â |
¥Æ¥à¤¬¸ÇͤΥǡ¼¥¿¹½Â¤¤ËÊÑ´¹¤·¤Æ¤«¤é¥¹¥¿¥Ã¥¯¤ËÀѤळ¤È¤ò°ÕÌ£¤¹¤ë¡£¤³¤ÎÊÑ |
¥µ¡¼¥Ð¤Ï¥¨¥é¡¼¥ª¥Ö¥¸¥§¥¯¥È¤ò¥¹¥¿¥Ã¥¯¤ËÀѤà¤À¤±¤Ç¡¢ |
´¹¤Ï1ÂÐ1Âбþ¤Ç¤¢¤ëɬÍפϤʤ¤¡£ |
ÌÀ¼¨¤µ¤ì¤Ê¤¤¸Â¤ê¥¨¥é¡¼¤¹¤é¤â¥¯¥é¥¤¥¢¥ó¥È¤ØÊÖ¤µ¤Ê¤¤¤³¤È¤Ë |
|
Ãí°Õ¤·¤Ê¤±¤ì¤Ð¤Ê¤é¤Ê¤¤¡£ |
|
|
|
·ë²Ì¤¬À¸¤¸¤ëÆ°ºî¤ò¥µ¡¼¥Ð¤¬¹Ô¤Ê¤Ã¤¿¾ì¹ç¡¢ |
¼¡¤Ë OpenXM ¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤ÎÌ¿Îᥳ¡¼¥É¤Ë¤Ä¤¤¤ÆÀâÌÀ¤¹¤ë¡£OpenXM ¥¹¥¿¥Ã¥¯ |
¥µ¡¼¥Ð¤ÏÆ°ºî¤Î·ë²Ì¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
¥Þ¥·¥ó¤Ë¤ª¤±¤ë¤¹¤Ù¤Æ¤ÎÌ¿Îá¤Ï4¥Ð¥¤¥È¤ÎŤµ¤ò»ý¤Ä¡£OpenXM µ¬Ìó¤Î¾¤Îµ¬Äê¤È |
¥µ¡¼¥Ð¤Ë¹Ô¤Ê¤ï¤»¤¿Æ°ºî¤Î·ë²Ì¤ò¥¯¥é¥¤¥¢¥ó¥È¤¬ÃΤꤿ¤¤¾ì¹ç¡¢ |
ƱÍͤˡ¢4¥Ð¥¤¥È¤Î¥Ç¡¼¥¿¤Ï32¥Ó¥Ã¥ÈÀ°¿ô¤È¸«¤Ê¤µ¤ì¤ë¤Î¤Ç¡¢¤³¤ÎÏÀʸ¤Ç¤â¤½¤Î |
¥¹¥¿¥Ã¥¯¤«¤é¥Ç¡¼¥¿¤ò¼è¤ê½Ð¤·Á÷¿®¤ò¹Ô¤Ê¤¦Ì¿Îá¤ò¥µ¡¼¥Ð¦¤ØÁ÷¤ì¤Ð¤è¤¤¡£ |
ɽµ¤Ë¤·¤¿¤¬¤¦¡£OpenXM ¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤ËÂФ¹¤ëÌ¿Îá¤Ï¥¹¥¿¥Ã¥¯¤ËÀѤޤì¤ë¤³ |
|
¤È¤Ï¤Ê¤¤¡£¸½ºß¤Î¤È¤³¤í¡¢OpenXM µ¬Ìó¤Ç¤Ï°Ê²¼¤ÎÌ¿Î᤬ÄêµÁ¤µ¤ì¤Æ¤¤¤ë¡£ |
|
|
%{\Huge °Ê²¼¡¢½ñ¤Ä¾¤·} |
\begin{verbatim} |
|
#define SM_popSerializedLocalObject 258 |
|
#define SM_popCMO 262 |
|
#define SM_popString 263 |
|
|
¥¯¥é¥¤¥¢¥ó¥È¤¬¥µ¡¼¥Ð¤Ø¥á¥Ã¥»¡¼¥¸¤òÁ÷¤ê¡¢ |
#define SM_mathcap 264 |
·×»»¤Î·ë²Ì¤òÆÀ¤ë¤È¤¤¤¦¼ê½ç¤òÄɤäƤ¤¤¯¤È¼¡¤Î¤è¤¦¤Ë¤Ê¤ë¡£ |
#define SM_pops 265 |
|
#define SM_setName 266 |
|
#define SM_evalName 267 |
|
#define SM_executeStringByLocalParser 268 |
|
#define SM_executeFunction 269 |
|
#define SM_beginBlock 270 |
|
#define SM_endBlock 271 |
|
#define SM_shutdown 272 |
|
#define SM_setMathCap 273 |
|
#define SM_executeStringByLocalParserInBatchMode 274 |
|
#define SM_getsp 275 |
|
#define SM_dupErrors 276 |
|
|
\begin{enumerate} |
#define SM_DUMMY_sendcmo 280 |
\item ¤Þ¤º¡¢¥¯¥é¥¤¥¢¥ó¥È¤¬¥µ¡¼¥Ð¤Ø¥á¥Ã¥»¡¼¥¸¤òÁ÷¤ë¡£ |
#define SM_sync_ball 281 |
¥µ¡¼¥Ð¤ÏÁ÷¤é¤ì¤Æ¤¤¿¥á¥Ã¥»¡¼¥¸¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
|
\item ¥¯¥é¥¤¥¢¥ó¥È¤¬¥µ¡¼¥Ð¤Ë¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤Ø¤ÎÌ¿Îá¤òÁ÷¤ë¤È¡¢ |
|
¥µ¡¼¥Ð¤ÏɬÍפʤÀ¤±¥¹¥¿¥Ã¥¯¤«¤é¥Ç¡¼¥¿¤ò¼è¤ê½Ð¤·¡¢ |
|
¼Â¹Ô¤·¤¿·ë²Ì¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
|
\item ºÇ¸å¤Ë¡Ö¥¹¥¿¥Ã¥¯¤«¤é¥Ç¡¼¥¿¤ò¼è¤ê½Ð¤·Á÷¿®¤ò¹Ô¤Ê¤¦Ì¿Îá¡×¤ò |
|
¥µ¡¼¥Ð¤ØÁ÷¤ë¤È¡¢¥µ¡¼¥Ð¤Ï¥¹¥¿¥Ã¥¯¤«¤é·×»»·ë²Ì¤ÎÆþ¤Ã¤Æ¤¤¤ë |
|
¥Ç¡¼¥¿¤ò¼è¤ê½Ð¤·¡¢¥¯¥é¥¤¥¢¥ó¥È¤ØÁ÷½Ð¤¹¤ë¡£ |
|
\end{enumerate} |
|
|
|
|
#define SM_control_kill 1024 |
|
#define SM_control_to_debug_mode 1025 |
|
#define SM_control_exit_debug_mode 1026 |
|
#define SM_control_ping 1027 |
|
#define SM_control_start_watch_thread 1028 |
|
#define SM_control_stop_watch_thread 1029 |
|
#define SM_control_reset_connection 1030 |
|
\end{verbatim} |
|
|
\section{CMO ¤Î¥Ç¡¼¥¿¹½Â¤} |
¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤ÏÌ¿Îá¤Î¼Â¹Ô¤Î·ë²Ì¤¬¤¢¤ë¾ì¹ç¡¢ |
|
|
OpenXM µ¬Ìó¤Ç¤Ï¡¢¿ô³ØŪ¥ª¥Ö¥¸¥§¥¯¥È¤òɽ¸½¤¹¤ëÊýË¡¤È¤·¤Æ |
·ë²Ì¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
CMO ·Á¼°(Common Mathematical Object format)¤òÄêµÁ¤·¤Æ¤¤¤ë¡£ |
¤³¤ì¤Ï¡¢¤¿¤È¤¨¥¨¥é¡¼¤¬µ¯¤³¤Ã¤¿¤È¤·¤Æ¤âƱ¤¸¤Ç¤¢¤ê¡¢ |
¤³¤Î CMO ·Á¼°¤ò»È¤Ã¤Æ¥á¥Ã¥»¡¼¥¸¤òÁ÷¤ë¤Ë¤Ï¡¢ |
¤³¤Î¾ì¹ç¤Ï¥¨¥é¡¼¥ª¥Ö¥¸¥§¥¯¥È¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
¥¿¥°¤ò OX\_DATA ¤Ë¤¹¤ì¤Ð¤è¤¤¡£ |
|
CMO ·Á¼°¤Ë¤ª¤±¤ë¥Ç¡¼¥¿¹½Â¤¤Ë¤Ä¤¤¤Æ°Ê²¼¤ÇÀâÌÀ¤¹¤ë¤¬¡¢ |
|
%OpenXM µ¬Ìó¤ÇÄêµÁ¤µ¤ì¤Æ¤¤¤ë¥á¥Ã¥»¡¼¥¸¤ò¼ÂºÝ¤ËºîÀ®¤¹¤ë¾ì¹ç¡¢ |
|
CMO ·Á¼°¤ÇÄêµÁ¤µ¤ì¤Æ¤¤¤ë¿ÇÜĹÀ°¿ô¤òÍý²ò¤·¤Æ¤ª¤¯¤È¡¢ |
|
CMO ·Á¼°¤Î¾¤Î¥Ç¡¼¥¿¹½Â¤¤À¤±¤Ç¤Ê¤¯¡¢ |
|
OpenXM µ¬Ìó¤ÇÄêµÁ¤µ¤ì¤Æ¤¤¤ëÍÍ¡¹¤Ê¥Ç¡¼¥¿¹½Â¤¤òÍý²ò¤¹¤ë½õ¤±¤Ë¤Ê¤ë¤È»×¤¨¤ë¤Î¤Ç¡¢ |
|
¤³¤³¤Ç¤Ï CMO ·Á¼°¤Î¿ÇÜĹÀ°¿ô¤Î¥Ç¡¼¥¿¹½Â¤¤Ë¤Ä¤¤¤Æ¤Î¤ßÀâÌÀ¤¹¤ë¡£ |
|
|
|
CMO ·Á¼°¤ÇÄêµÁ¤µ¤ì¤Æ¤¤¤ë¥Ç¡¼¥¿¤Ï¿ÇÜĹÀ°¿ô°Ê³°¤Ë¤â |
%°Ê²¼¡¢¤É¤¦¤¤¤¦¤È¤¤Ë·ë²Ì¤ò¥¹¥¿¥Ã¥¯¤ËÀѤफ¥¨¥é¡¼¤Î¾ì¹ç¤É¤¦¤¹¤ë¤«¤ÎÀâÌÀ¤¬ |
ʸ»úÎó¤ä¥ê¥¹¥È¹½Â¤¤Ê¤É¤¬¤¢¤ë¡£¤É¤Î¤è¤¦¤Ê¥Ç¡¼¥¿¤Ç¤¢¤ë¤«¤Ï |
%ɬÍפǤ¢¤í¤¦¡£ |
¥Ç¡¼¥¿¤ÎÀèƬ 4 ¥Ð¥¤¥È¤Ë¤¢¤ë(¥á¥Ã¥»¡¼¥¸¤Î¼±Ê̻ҤȤÏÊ̤ˤ¢¤ë)¥¿¥°¤ò¸«¤ì¤Ð |
|
ȽÊ̤Ǥ¤ë¤è¤¦¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
|
¤³¤ì¤Ï¥á¥Ã¥»¡¼¥¸¤Î¼ïÎà¤ÎȽÊ̤λÅÊý¤È¤ª¤Ê¤¸¤Ç¤¢¤ë¡£ |
\section{CMO ¤Î¥Ç¡¼¥¿¹½Â¤}\label{sec:cmo} |
¤Ê¤ª¡¢¥¿¥°¤Ï³Æ¥Ç¡¼¥¿Ëè¤Ë 32 bit ¤ÎÀ°¿ô¤Çɽ¤µ¤ì¤Æ¤ª¤ê¡¢ |
|
¿ÇÜĹÀ°¿ô¤Ï 20 ¤È¤Ê¤Ã¤Æ¤¤¤ë¡£ |
OpenXM µ¬Ìó¤Ç¤Ï¡¢¿ô³ØŪ¥ª¥Ö¥¸¥§¥¯¥È¤òɽ¸½¤¹¤ëÊýË¡¤È¤·¤Æ CMO ·Á¼°(Common |
¤è¤¯»È¤ï¤ì¤ë¤È»×¤ï¤ì¤ë CMO ·Á¼°¤Î¥¿¥°¤ò¤¢¤²¤Æ¤ª¤¯¡£ |
Mathematical Object format)¤òÄêµÁ¤·¤Æ¤¤¤ë¡£¤³¤Î CMO ·Á¼°¤Ë¤·¤¿¤¬¤Ã¤¿¥Ç¡¼ |
|
¥¿¤Ï¡¢¼±Ê̻Ҥ¬ OX\_DATA ¤Ç¤¢¤ë¤è¤¦¤Ê¥á¥Ã¥»¡¼¥¸¤Î¥Ü¥Ç¥£¤Ë¤Ê¤ë¤³¤È¤òÁÛÄꤷ |
|
¤Æ¤¤¤ë¡£ |
|
|
|
CMO ·Á¼°¤Ë¤ª¤±¤ë¥Ç¡¼¥¿¹½Â¤¤Ï¼¡¤Î¤è¤¦¤Ê¹½Â¤¤ò¤â¤Ä¡£ |
|
|
|
\begin{tabular}{|c|c|} \hline |
|
¥Ø¥Ã¥À & \hspace{10mm} ¥Ü¥Ç¥£ \hspace{10mm} \\ \hline |
|
\end{tabular} |
|
|
|
¥Ø¥Ã¥À¤Ï4¥Ð¥¤¥È¤Ç¤¢¤ë¡£¥Ü¥Ç¥£¤ÎŤµ¤Ï¤½¤ì¤¾¤ì¤Î¥Ç¡¼¥¿¤Ë¤è¤Ã¤Æ°Û¤Ê¤ë¤¬¡¢ |
|
0¤Ç¤â¤è¤¤¡£ |
|
|
|
¥á¥Ã¥»¡¼¥¸¤ÈƱÍͤ˥إåÀ¤Ï4¥Ð¥¤¥Èñ°Ì¤Ë´ÉÍý¤µ¤ì¤ë¡£¤¹¤Ê¤ï¤Á¡¢CMO ¤Ç¤Ï¥Ø¥Ã |
|
¥À¤Ï°ì¤Ä¤À¤±¤Î¾ðÊó¤ò´Þ¤à¡£¤³¤Î4¥Ð¥¤¥È¤Î¥Ø¥Ã¥À¤Î¤³¤È¤ò¥¿¥°¤È¤â¤¤¤¦¡£¤µ¤Æ¡¢ |
|
CMO ¤Ç¤Ï¡¢¥¿¥°¤Ë¤è¤Ã¤Æ¥Ü¥Ç¥£¤ÎÏÀÍýŪ¹½Â¤¤¬·èÄꤹ¤ë¡£¤¹¤Ê¤ï¤Á¡¢¥¿¥°¤Ï¤½¤ì |
|
¤¾¤ì¤Î¥Ç¡¼¥¿¹½Â¤¤È1ÂÐ1¤ËÂбþ¤¹¤ë¼±Ê̻ҤǤ¢¤ë¡£¤½¤ì¤¾¤ì¤ÎÏÀÍýŪ¹½Â¤¤Ï |
|
\cite{OpenXM-1999} ¤Ë¾Ü½Ò¤µ¤ì¤Æ¤¤¤ë¡£¸½ºß¤Î OpenXM µ¬Ìó¤Ç¤Ï°Ê²¼¤Î CMO ¤¬ |
|
ÄêµÁ¤µ¤ì¤Æ¤¤¤ë¡£ |
|
|
\begin{verbatim} |
\begin{verbatim} |
#define CMO_INT32 2 /* 32 ¥Ó¥Ã¥ÈÀ°¿ô */ |
#define CMO_ERROR2 0x7f000002 |
#define CMO_STRING 4 /* ʸ»úÎó */ |
#define CMO_NULL 1 |
#define CMO_MATHCAP 5 /* mathcap(¸å½Ò) */ |
#define CMO_INT32 2 |
#define CMO_LIST 17 /* ¥ê¥¹¥È¹½Â¤ */ |
#define CMO_DATUM 3 |
#define CMO_ZZ 20 /* ¿ÇÜĹÀ°¿ô */ |
#define CMO_STRING 4 |
|
#define CMO_MATHCAP 5 |
|
|
|
#define CMO_START_SIGNATURE 0x7fabcd03 |
|
#define CMO_ARRAY 16 |
|
#define CMO_LIST 17 |
|
#define CMO_ATOM 18 |
|
#define CMO_MONOMIAL32 19 |
|
#define CMO_ZZ 20 |
|
#define CMO_QQ 21 |
|
#define CMO_ZERO 22 |
|
#define CMO_DMS_GENERIC 24 |
|
#define CMO_DMS_OF_N_VARIABLES 25 |
|
#define CMO_RING_BY_NAME 26 |
|
#define CMO_RECURSIVE_POLYNOMIAL 27 |
|
#define CMO_LIST_R 28 |
|
|
|
#define CMO_INT32COEFF 30 |
|
#define CMO_DISTRIBUTED_POLYNOMIAL 31 |
|
#define CMO_POLYNOMIAL_IN_ONE_VARIABLE 33 |
|
#define CMO_RATIONAL 34 |
|
|
|
#define CMO_64BIT_MACHINE_DOUBLE 40 |
|
#define CMO_ARRAY_OF_64BIT_MACHINE_DOUBLE 41 |
|
#define CMO_128BIT_MACHINE_DOUBLE 42 |
|
#define CMO_ARRAY_OF_128BIT_MACHINE_DOUBLE 43 |
|
|
|
#define CMO_BIGFLOAT 50 |
|
#define CMO_IEEE_DOUBLE_FLOAT 51 |
|
|
|
#define CMO_INDETERMINATE 60 |
|
#define CMO_TREE 61 |
|
#define CMO_LAMBDA 62 |
\end{verbatim} |
\end{verbatim} |
|
|
¤³¤³¤Ç 32 bit ¤ÎÀ°¿ô¤Îɽ¸½ÊýË¡¤Ë¤Ä¤¤¤ÆÀâÌÀ¤¹¤ëɬÍפ¬¤¢¤ë¡£ |
¤³¤ÎÃæ¤Ç CMO\_INT32, ... ¤Ç¼±Ê̤µ¤ì¤ë¥ª¥Ö¥¸¥§¥¯¥È¤ÏºÇ¤â´ðËÜŪ¤Ê¥ª¥Ö¥¸¥§ |
OpenXM µ¬Ìó¤Ç¤Ï¥Ð¥¤¥È¥¹¥È¥ê¡¼¥à¤Ç 32 bit ¤ÎÀ°¿ô 20 ¤ò |
¥¯¥È¤Ç¤¢¤Ã¤Æ¡¢¤¹¤Ù¤Æ¤Î OpenXM Âбþ¥·¥¹¥Æ¥à¤Ë¼ÂÁõ¤µ¤ì¤Æ¤¤¤Ê¤±¤ì¤Ð¤Ê¤é¤Ê¤¤¡£ |
{\tt 00 00 00 14} ¤Èɽ¤¹ÊýË¡¤È {\tt 14 00 00 00} ¤Èɽ¤¹ÊýË¡¤¬¤¢¤ë¡£ |
|
¤³¤Îɽ¸½ÊýË¡¤Î°ã¤¤¤Ï¥¯¥é¥¤¥¢¥ó¥È¤È¥µ¡¼¥Ð¤ÎºÇ½é¤ÎÀܳ»þ¤Ë |
|
ÁÐÊý¤Î¹ç°Õ¤Ç·èÄꤹ¤ë¤³¤È¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
|
¤Ê¤ª¡¢¹ç°Õ¤¬¤Ê¤¤¾ì¹ç¤Ë¤ÏÁ°¼Ô¤Îɽ¸½ÊýË¡ |
|
(°Ê¸å¡¢¤³¤Îɽ¸½ÊýË¡¤ò¥Í¥Ã¥È¥ï¡¼¥¯¥Ð¥¤¥È¥ª¡¼¥À¡¼¤È¸Æ¤Ö)¤ò |
|
»È¤¦¤³¤È¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
|
¤Þ¤¿¡¢Éé¤Î¿ô¤òɽ¸½¤¹¤ëɬÍפ¬¤¢¤ë¤È¤¤Ë¤Ï¡¢ |
|
2 ¤ÎÊä¿ôɽ¸½¤ò»È¤¦¤³¤È¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
|
|
|
CMO ·Á¼°¤Î¿ÇÜĹÀ°¿ô¤Ï¡¢ Gnu MP¥é¥¤¥Ö¥é¥êÅù¤ò»²¹Í¤Ë¤·¤Æ¤ª¤ê¡¢ |
¤³¤ì¤é¤Ë¤Ä¤¤¤Æ¤Î²òÀâ¤ò¹Ô¤¦Á°¤ËµË¡¤Ë¤Ä¤¤¤Æ¡¢¾¯¤·ÀâÌÀ¤·¤Æ¤ª¤¯¡£ |
Éä¹çÉÕ¤ÀäÂÐÃÍɽ¸½¤òÍѤ¤¤Æ¤¤¤ë¡£ |
¤³¤ÎÏÀʸ¤Ç¤Ï¡¢Âçʸ»ú¤Ç CMO\_INT32 ¤È½ñ¤¤¤¿¾ì¹ç¤Ë¤Ï¡¢¾åµ¤ÇÄêµÁ¤·¤¿¼±ÊÌ»Ò |
¥¿¥°°Ê¹ß¤Î·Á¼°¤Ï¼¡¤Î¤è¤¦¤Ë¤Ê¤ë¡£ |
¤òɽ¤ï¤¹¡£¤Þ¤¿ CMO\_INT32 ¤Ç¼±Ê̤µ¤ì¤ë¥ª¥Ö¥¸¥§¥¯¥È¤Î¥¯¥é¥¹(¤¢¤ë¤¤¤Ï¥Ç¡¼ |
|
¥¿¹½Â¤)¤ò cmo\_int32 ¤È¾®Ê¸»ú¤Çɽ¤ï¤¹¤³¤È¤Ë¤¹¤ë¡£ |
|
|
\begin{tabular}{|c|c|c|c|c|} \hline |
¤µ¤Æ cmo ¤òɽ¸½¤¹¤ë¤¿¤á¤Î°ì¤Ä¤ÎµË¡¤òƳÆþ¤¹¤ë¡£¤³¤ÎµË¡¤Ï CMO expression |
$f$ & $b_0$ & $b_1$ & $\cdots$ & $b_{n-1}$ \\ \hline |
¤È¸Æ¤Ð¤ì¤Æ¤¤¤ë¡£¤½¤ÎÀµ³Î¤Ê·Á¼°ÅªÄêµÁ¤Ï \cite{OpenXM-1999} ¤ò»²¾È¤¹¤ë¤³¤È¡£ |
\end{tabular} |
|
|
|
¤³¤³¤Ç¡¢ 1 ¤Ä¤ÎÏÈ¤Ï 4 ¥Ð¥¤¥È¤òɽ¤·¡¢ |
¤Þ¤º CMO expssion ¤Ï Lisp É÷ɽ¸½¤Î°ì¼ï¤Ç¡¢ cmo ¤ò³ç¸Ì¤Ç°Ï¤ó¤À¥ê¥¹¥È¤È¤· |
$f$ ¤ÏÉä¹çÉÕ¤ 32 ¥Ó¥Ã¥ÈÀ°¿ô¤ò¡¢ |
¤Æɽ¸½¤¹¤ë¡£¤½¤ì¤¾¤ì¤ÎÍ×ÁǤϥ«¥ó¥Þ¤Ç¶èÀڤ롣 |
$b_0$, $b_1$, $\cdots$, $b_{n-1}$ ¤ÏÉä¹ç¤Ê¤· 32 ¥Ó¥Ã¥ÈÀ°¿ô¤òɽ¤·¤Æ¤¤¤ë¡£ |
Î㤨¤Ð¡¢ |
¤µ¤é¤Ë¡¢ $|f| = n$ ¤¬À®¤êΩ¤¿¤Ê¤±¤ì¤Ð¤Ê¤é¤Ê¤¤¡£ |
\begin{quote} |
¤³¤Î¥ª¥Ö¥¸¥§¥¯¥È¤Ï |
(17, {\sl int32}, (CMO\_NULL), (2, {\sl int32} $n$)) |
\[ \mbox{sgn}(f) \times \{ b_0 (2^{32})^0 + b_1 (2^{32})^1 + \cdots |
\end{quote} |
+ b_{n-1} (2^{32})^{n-1} \} \] |
¤Ï CMO expression ¤Ç¤¢¤ë¡£¤³¤³¤Ç¡¢¾®Ê¸»ú¤Î¼ÐÂΤÇɽ¤µ¤ì¤¿``{\sl int32}'' |
¤È¤¤¤¦À°¿ô¤Ç¤¢¤ë¤ÈÄêµÁ¤µ¤ì¤Æ¤¤¤ë¡£ |
¤Ï 4¥Ð¥¤¥È¤ÎǤ°Õ¤Î¥Ç¡¼¥¿¤òɽ¤¹µ¹æ¤Ç¤¢¤ê¡¢``{\sl int32} $n$'' ¤ÏƱ¤¸¤¯ 4 |
¤¿¤À¤·¡¢ |
¥Ð¥¤¥È¤Î¥Ç¡¼¥¿¤Ç¤¢¤ë¤¬°Ê²¼¤ÎÀâÌÀ¤Ç $n$ ¤Èɽ¤¹¤³¤È¤ò¼¨¤¹¡£¤Þ¤¿¿ô»ú 17, 2 |
\[ \mbox{sgn}(f) = \left\{ \begin{array}{ll} |
¤Ê¤É¤Ï 4¥Ð¥¤¥È¤Î¥Ç¡¼¥¿¤ÇÀ°¿ôÃͤȤ·¤Æ¤ß¤¿¤È¤¤ÎÃͤò°ÕÌ£¤¹¤ë¡£CMO\_NULL ¤Ï |
1 & f>0 \\ |
¼±ÊÌ»Ò(¤¹¤Ê¤ï¤Á¿ô»ú 1 ¤ÈÅù²Á)¤Ç¤¢¤ë¡£¤³¤ÎµË¡¤«¤é¾åµ¤Î¥Ç¡¼¥¿¤Ï 20 ¥Ð¥¤ |
0 & f=0 \\ |
¥È¤ÎÂ礤µ¤Î¥Ç¡¼¥¿¤Ç¤¢¤ë¤³¤È¤¬Ê¬¤«¤ë¡£ |
-1 & f<0 \\ \end{array} \right. \] |
|
¤Ç¤¢¤ë¡£ |
|
|
|
¤³¤³¤Ç¶ñÂÎÎã¤ò¤À¤½¤¦¡£ |
¤µ¤Æ¡¢¤³¤ÎµË¡¤Î¤â¤È¤Ç cmo\_int32 ¤ò¼¡¤Î¥Ç¡¼¥¿¹½Â¤¤ò»ý¤Ä¤ÈÄêµÁ¤¹¤ë¡£ |
$4294967298 = 1 \times 2^{32} + 2$ ¤ò CMO ·Á¼°¤Î |
\begin{quote} |
¥Í¥Ã¥È¥ï¡¼¥¯¥Ð¥¤¥È¥ª¡¼¥À¡¼¡¢Â¿ÇÜĹÀ°¿ô¤Çɽ¸½¤¹¤ë¤È¡¢ |
cmo\_int32 := (CMO\_INT32, {\sl int32}) |
\begin{center} |
\end{quote} |
{\tt 00 00 00 14 00 00 00 02 00 00 00 02 00 00 00 01} |
|
\end{center} |
|
¤È¤Ê¤ë¡£¤Þ¤¿¡¢Æ±¤¸É½¸½ÊýË¡¤Ç $-1$ ¤òɽ¸½¤¹¤ë¤È¡¢ |
|
\begin{center} |
|
{\tt 00 00 00 14 ff ff ff ff 00 00 00 01} |
|
\end{center} |
|
¤È¤Ê¤ë¡£ |
|
|
|
|
{\Huge ƱÍÍ¤Ë cmo\_string, cmo\_list ¤Ê¤É¤òÄêµÁ} |
|
|
|
cmo\_string := (CMO\_STRING, {\sl int32}, string) |
|
|
|
cmo\_list := (CMO\_LIST, {\sl int32},... |
|
|
|
% ¤³¤³¤Ç 32 bit ¤ÎÀ°¿ô¤Îɽ¸½ÊýË¡¤Ë¤Ä¤¤¤Æ¿¨¤ì¤Æ¤ª¤¯¡£ |
|
% OpenXM µ¬Ìó¤Ç¤Ï¥Ð¥¤¥È¥¹¥È¥ê¡¼¥à¤Ç 32 bit ¤ÎÀ°¿ô 20 ¤ò |
|
% {\tt 00 00 00 14} ¤Èɽ¤¹ÊýË¡¤È {\tt 14 00 00 00} ¤Èɽ¤¹ÊýË¡¤¬¤¢¤ë¡£ |
|
% ¤³¤Îɽ¸½ÊýË¡¤Î°ã¤¤¤Ï¥¯¥é¥¤¥¢¥ó¥È¤È¥µ¡¼¥Ð¤ÎºÇ½é¤ÎÀܳ»þ¤Ë |
|
% ÁÐÊý¤Î¹ç°Õ¤Ç·èÄꤹ¤ë¤³¤È¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
|
% ¤Ê¤ª¡¢¹ç°Õ¤¬¤Ê¤¤¾ì¹ç¤Ë¤ÏÁ°¼Ô¤Îɽ¸½ÊýË¡ |
|
% (°Ê¸å¡¢¤³¤Îɽ¸½ÊýË¡¤ò¥Í¥Ã¥È¥ï¡¼¥¯¥Ð¥¤¥È¥ª¡¼¥À¡¼¤È¸Æ¤Ö)¤ò |
|
% »È¤¦¤³¤È¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
|
% ¤Þ¤¿¡¢Éé¤Î¿ô¤òɽ¸½¤¹¤ëɬÍפ¬¤¢¤ë¤È¤¤Ë¤Ï¡¢ |
|
% 2 ¤ÎÊä¿ôɽ¸½¤ò»È¤¦¤³¤È¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
|
|
|
% Àè¤Û¤É¤Î¡¢ (CMO\_INT32, 123456789) ¤ò¥Í¥Ã¥È¥ï¡¼¥¯¥Ð¥¤¥È¥ª¡¼¥À¡¼¤Ç |
|
% ¥Ð¥¤¥ÈÎó¤Ëľ¤¹¤È¡¢ |
|
% \begin{center} |
|
% {\tt 00 00 00 02 07 5b cd 15} |
|
% \end{center} |
|
% ¤È¤Ê¤ê¡¢ |
|
% (CMO\_STRING, 6, ``OpenXM'') ¤Ï |
|
% \begin{center} |
|
% {\tt 00 00 00 04 00 00 00 06 4f 70 65 6e 58 4d} |
|
% \end{center} |
|
% ¤È¤Ê¤ë¡£ |
|
|
|
% CMO ·Á¼°¤Î¿ÇÜĹÀ°¿ô¤Ï¡¢ Gnu MP¥é¥¤¥Ö¥é¥êÅù¤ò»²¹Í¤Ë¤·¤Æ¤ª¤ê¡¢ |
|
% Éä¹æÉÕ¤ÀäÂÐÃÍɽ¸½¤òÍѤ¤¤Æ¤¤¤ë¡£ |
|
% ¥¿¥°°Ê¹ß¤Î·Á¼°¤Ï¼¡¤Î¤è¤¦¤Ë¤Ê¤ë¡£ |
|
|
|
% \begin{tabular}{|c|c|c|c|c|} \hline |
|
% $f$ & $b_0$ & $b_1$ & $\cdots$ & $b_{n-1}$ \\ \hline |
|
% \end{tabular} |
|
|
|
% ¤³¤³¤Ç¡¢ 1 ¤Ä¤ÎÏÈ¤Ï 4 ¥Ð¥¤¥È¤òɽ¤·¡¢ |
|
% $f$ ¤ÏÉä¹æÉÕ¤ 32 ¥Ó¥Ã¥ÈÀ°¿ô¤ò¡¢ |
|
% $b_0$, $b_1$, $\cdots$, $b_{n-1}$ ¤ÏÉä¹æ¤Ê¤· 32 ¥Ó¥Ã¥ÈÀ°¿ô¤òɽ¤·¤Æ¤¤¤ë¡£ |
|
% ¤µ¤é¤Ë¡¢ $|f| = n$ ¤¬À®¤êΩ¤¿¤Ê¤±¤ì¤Ð¤Ê¤é¤Ê¤¤¡£ |
|
% ¤³¤Î¥ª¥Ö¥¸¥§¥¯¥È¤Ï |
|
% \[ \mbox{sgn}(f) \times \{ b_0 (2^{32})^0 + b_1 (2^{32})^1 + \cdots |
|
% + b_{n-1} (2^{32})^{n-1} \} \] |
|
% ¤È¤¤¤¦À°¿ô¤Ç¤¢¤ë¤ÈÄêµÁ¤µ¤ì¤Æ¤¤¤ë¡£ |
|
% ¤¿¤À¤·¡¢ |
|
% \[ \mbox{sgn}(f) = \left\{ \begin{array}{ll} |
|
% 1 & f>0 \\ |
|
% 0 & f=0 \\ |
|
% -1 & f<0 \\ \end{array} \right. \] |
|
% ¤Ç¤¢¤ë¡£ |
|
|
|
% ¤³¤³¤Ç¶ñÂÎÎã¤ò¤À¤½¤¦¡£ |
|
% $4294967298 = 1 \times 2^{32} + 2$ ¤ò CMO ·Á¼°¤Î |
|
% ¥Í¥Ã¥È¥ï¡¼¥¯¥Ð¥¤¥È¥ª¡¼¥À¡¼¡¢Â¿ÇÜĹÀ°¿ô¤Çɽ¸½¤¹¤ë¤È¡¢ |
|
% \begin{center} |
|
% {\tt 00 00 00 14 00 00 00 02 00 00 00 02 00 00 00 01} |
|
% \end{center} |
|
% ¤È¤Ê¤ë¡£¤Þ¤¿¡¢Æ±¤¸É½¸½ÊýË¡¤Ç $-1$ ¤òɽ¸½¤¹¤ë¤È¡¢ |
|
% \begin{center} |
|
% {\tt 00 00 00 14 ff ff ff ff 00 00 00 01} |
|
% \end{center} |
|
% ¤È¤Ê¤ë¡£ |
|
|
|
|
\section{mathcap ¤Ë¤Ä¤¤¤Æ} |
\section{mathcap ¤Ë¤Ä¤¤¤Æ} |
|
|
OpenXM µ¬Ìó¤Ç¤Ï¡¢ÄÌ¿®»þ¤ËÍѤ¤¤é¤ì¤ë¥á¥Ã¥»¡¼¥¸¤Î¼ïÎà¤ò |
OpenXM µ¬Ìó¤Ç¤Ï¡¢ÄÌ¿®»þ¤ËÍѤ¤¤é¤ì¤ë¥á¥Ã¥»¡¼¥¸¤Î¼ïÎà¤ò³Æ¥½¥Õ¥È¥¦¥§¥¢¤¬À© |
³Æ¥½¥Õ¥È¥¦¥§¥¢¤¬À©¸Â¤¹¤ëÊýË¡¤òÍÑ°Õ¤·¤Æ¤¤¤ë¡£ |
¸Â¤¹¤ëÊýË¡¤òÍÑ°Õ¤·¤Æ¤¤¤ë¡£¤³¤ì¤Ï³Æ¥½¥Õ¥È¥¦¥§¥¢¤Î¼ÂÁõ¤Ë¤è¤Ã¤Æ¤Ï¤¹¤Ù¤Æ¤Î¥á¥Ã |
¤³¤ì¤Ï³Æ¥½¥Õ¥È¥¦¥§¥¢¤Î¼ÂÁõ¤Ë¤è¤Ã¤Æ¤Ï¤¹¤Ù¤Æ¤Î¥á¥Ã¥»¡¼¥¸¤ò |
¥»¡¼¥¸¤ò¥µ¥Ý¡¼¥È¤¹¤ë¤Î¤¬º¤Æñ¤Ê¾ì¹ç¤¬¤¢¤ë¤«¤é¤Ç¤¢¤ë¡£¤Þ¤¿¡¢³Æ¥½¥Õ¥È¥¦¥§¥¢ |
¥µ¥Ý¡¼¥È¤¹¤ë¤Î¤¬º¤Æñ¤Ê¾ì¹ç¤¬¤¢¤ë¤«¤é¤Ç¤¢¤ë¡£ |
¤Ç¥á¥Ã¥»¡¼¥¸¤Î¼ïÎà¤ò³ÈÄ¥¤·¤¿¤¤¾ì¹ç¤Ë¤â͸ú¤Ç¤¢¤ë¡£¤³¤ÎÀ©¸Â(¤¢¤ë¤¤¤Ï³ÈÄ¥) |
¤Þ¤¿¡¢³Æ¥½¥Õ¥È¥¦¥§¥¢¤Ç¥á¥Ã¥»¡¼¥¸¤Î¼ïÎà¤ò³ÈÄ¥¤·¤¿¤¤¾ì¹ç¤Ë¤â͸ú¤Ç¤¢¤ë¡£ |
¤Ï mathcap ¤È¸Æ¤Ð¤ì¤ë¥Ç¡¼¥¿¹½Â¤¤Ë¤è¤Ã¤Æ¹Ô¤ï¤ì¤ë¡£¤³¤ÎÀá¤Ç¤Ï mathcap ¤Î¥Ç¡¼ |
¤³¤ÎÀ©¸Â(¤¢¤ë¤¤¤Ï³ÈÄ¥)¤Ï CMO ·Á¼°¤ÇÄêµÁ¤µ¤ì¤Æ¤¤¤ë mathcap ¤È |
¥¿¹½Â¤¤È¡¢¶ñÂÎŪ¤Ê¥á¥Ã¥»¡¼¥¸¤ÎÀ©¸Â¤Î¼ê³¤¤Ë¤Ä¤¤¤ÆÀâÌÀ¤¹¤ë¡£ |
¸Æ¤Ð¤ì¤ë¥Ç¡¼¥¿¹½Â¤¤Ë¤è¤Ã¤Æ¹Ô¤ï¤ì¤ë¡£ |
|
¤³¤ÎÀá¤Ç¤Ï mathcap ¤Î¥Ç¡¼¥¿¹½Â¤¤È¡¢ |
|
¶ñÂÎŪ¤Ê¥á¥Ã¥»¡¼¥¸¤ÎÀ©¸Â¤Î¼ê³¤¤Ë¤Ä¤¤¤ÆÀâÌÀ¤¹¤ë¡£ |
|
|
|
¤Þ¤º¡¢¼ê³¤¤Ë¤Ä¤¤¤ÆÀâÌÀ¤·¤è¤¦¡£ |
¤Ç¤Ï¡¢¼ê³¤¤Ë¤Ä¤¤¤ÆÀâÌÀ¤·¤è¤¦¡£ |
¥¯¥é¥¤¥¢¥ó¥È¦¤Î mathcap ¤ò¥µ¡¼¥Ð¤ØÁ÷¤ë¤È¡¢ |
|
¤¹¤Ç¤ËÀâÌÀ¤·¤¿¤è¤¦¤Ë¡¢¥µ¡¼¥Ð¤Ï¼õ¤±¼è¤Ã¤¿ mathcap ¤ò¥¹¥¿¥Ã¥¯¤ËÀѤ߾夲¤ë¡£ |
|
¼¡¤Ë¥¯¥é¥¤¥¢¥ó¥È¤Ï¥¹¥¿¥Ã¥¯¥Þ¥·¥ó¤Ø¤ÎÌ¿Îá¤ò¥µ¡¼¥Ð¤ØÁ÷¤ë¤³¤È¤Ë¤è¤ê¡¢ |
|
¥µ¡¼¥Ð¤Ï¥¹¥¿¥Ã¥¯¤ËÀѤޤì¤Æ¤¤¤ë mathcap ¤ò¼è¤ê½Ð¤·¡¢ |
|
mathcap ¤ÇÀßÄꤵ¤ì¤Æ¤¤¤Ê¤¤¥á¥Ã¥»¡¼¥¸¤ò¥¯¥é¥¤¥¢¥ó¥È¦¤Ø |
|
Á÷¤é¤Ê¤¤¤è¤¦¤ËÀßÄꤹ¤ë¡£ |
|
¥µ¡¼¥Ð¦¤Î mathcap ¤¬Íߤ·¤¤¾ì¹ç¤Ë¤Ï°Ê²¼¤Î¤è¤¦¤Ë¤¹¤ë¡£ |
|
¥¯¥é¥¤¥¢¥ó¥È¤¬¥µ¡¼¥Ð¤Ë mathcap ¤òÍ׵᤹¤ë¤È¡¢ |
|
¥µ¡¼¥Ð¤Ï¥µ¡¼¥Ð¼«¿È¤Î mathcap ¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
|
¤µ¤é¤Ë¥µ¡¼¥Ð¤Ë¥¹¥¿¥Ã¥¯¤«¤é¥Ç¡¼¥¿¤ò¼è¤ê½Ð¤·Á÷¿®¤ò¹Ô¤Ê¤¦Ì¿Îá¤òÁ÷¤ì¤Ð¡¢ |
|
¥µ¡¼¥Ð¤Ï¥¹¥¿¥Ã¥¯¤Ë¤¢¤ë mathcap ¤ò¥¯¥é¥¤¥¢¥ó¥È¤ØÁ÷½Ð¤¹¤ë¡£ |
|
¤³¤Î¤è¤¦¤Ë¤·¤Æ¥¯¥é¥¤¥¢¥ó¥È¤Ï¥µ¡¼¥Ð¦¤Î mathcap ¤ò¼õ¤±¼è¤ì¤ë¤ï¤±¤Ç¤¢¤ë¡£ |
|
|
|
|
Âè°ì¤Ë¥µ¡¼¥Ð¤Îµ¡Ç½¤òÀ©¸Â¤¹¤ë¤Ë¤Ï¼¡¤Î¤è¤¦¤Ë¤¹¤ë¡£¥¯¥é¥¤¥¢¥ó¥È¤¬ mathcap |
|
¥ª¥Ö¥¸¥§¥¯¥È¤ò¥µ¡¼¥Ð¤ØÁ÷¤ë¤È¡¢¥µ¡¼¥Ð¤Ï¼õ¤±¼è¤Ã¤¿mathcap ¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
|
¼¡¤Ë¥¯¥é¥¤¥¢¥ó¥È¤¬Ì¿Îá SM\_setMathCap ¤òÁ÷¤ë¤È¡¢¥µ¡¼¥Ð¤Ï¥¹¥¿¥Ã¥¯¤ÎºÇ¾å°Ì |
|
¤ËÀѤޤì¤Æ¤¤¤ë mathcap ¥ª¥Ö¥¸¥§¥¯¥È¤ò¼è¤ê½Ð¤·¡¢mathcap ¤ÇÀßÄꤵ¤ì¤Æ¤¤¤Ê |
|
¤¤¥á¥Ã¥»¡¼¥¸¤ò¥¯¥é¥¤¥¢¥ó¥È¤ØÁ÷¤é¤Ê¤¤¤è¤¦¤ËÀ©¸Â¤ò¹Ô¤¦¡£ |
|
|
|
ÂèÆó¤Ë¥¯¥é¥¤¥¢¥ó¥È¤òÀ©¸Â¤¹¤ë¤Ë¤Ï¼¡¤Î¤è¤¦¤Ë¤¹¤ë¡£¥¯¥é¥¤¥¢¥ó¥È¤¬¥µ¡¼¥Ð¤ËÌ¿ |
|
Îá SM\_mathcap ¤òÁ÷¤ë¤È¡¢¥µ¡¼¥Ð¤Ï mathcap ¥ª¥Ö¥¸¥§¥¯¥È¤ò¥¹¥¿¥Ã¥¯¤ËÀѤࡣ |
|
¤µ¤é¤ËÌ¿Îá SM\_popCMO ¤òÁ÷¤ë¤È¡¢¥µ¡¼¥Ð¤Ï¥¹¥¿¥Ã¥¯¤ÎºÇ¾å°Ì¤Î¥ª¥Ö¥¸¥§¥¯¥È |
|
(¤¹¤Ê¤ï¤Á mathcap ¥ª¥Ö¥¸¥§¥¯¥È)¤ò¥Ü¥Ç¥£¤È¤¹¤ë¥á¥Ã¥»¡¼¥¸¤ò¥¯¥é¥¤¥¢¥ó¥È¤Ë |
|
Á÷ÉÕ¤¹¤ë¡£¥¯¥é¥¤¥¢¥ó¥È¤Ï¤½¤Î¥ª¥Ö¥¸¥§¥¯¥È¤ò²òÀϤ·¤Æ¡¢À©¸Â¤ò¤«¤±¤ë¡£ |
|
|
¼¡¤Ë mathcap ¤Î¥Ç¡¼¥¿¹½Â¤¤Ë¤Ä¤¤¤ÆÀâÌÀ¤¹¤ë¡£ |
¼¡¤Ë mathcap ¤Î¥Ç¡¼¥¿¹½Â¤¤Ë¤Ä¤¤¤ÆÀâÌÀ¤¹¤ë¡£ |
mathcap ¤Ï CMO ·Á¼°¤ÇÄêµÁ¤µ¤ì¤Æ¤ª¤ê¡¢ |
mathcap ¤Ï CMO ¤Î°ì¼ï¤Ç¤¢¤ë¤Î¤Ç¡¢¤¹¤Ç¤ËÀâÌÀ¤·¤¿¤è¤¦¤Ë |
1 ¤Ä¤Î CMO ·Á¼°¤Î¥ª¥Ö¥¸¥§¥¯¥È¤ò»ý¤Ä¡£ |
\begin{verbatim} |
¤½¤Î¥ª¥Ö¥¸¥§¥¯¥È¤Ï°Ê²¼¤ÇÀâÌÀ¤¹¤ë 3 ¤Ä¤ÎÍ×ÁǤ«¤é¤Ê¤ë¥ê¥¹¥È¤Ç¤Ê¤±¤ì¤Ð¤Ê¤é¤Ê¤¤¡£ |
¥Ø¥Ã¥À ¥Ü¥Ç¥£ |
|
\end{verbatim} |
|
¤Î¹½Â¤¤ò»ý¤Á¥Ø¥Ã¥À¤ÎÃÍ¤Ï 5 ¤Ç¤¢¤ë(\ref{sec:cmo} Àá¤ò»²¾È¤Î¤³¤È)¡£ |
|
¥Ü¥Ç¥£¤Ï cmo\_list ¥ª¥Ö¥¸¥§¥¯¥È¤Ç¤Ê¤±¤ì¤Ð¤Ê¤é¤Ê¤¤¡£ |
|
|
|
¤µ¤Æ¡¢mathcap ¥ª¥Ö¥¸¥§¥¯¥È¤Î¥Ü¥Ç¥£¤Î cmo\_list ¥ª¥Ö¥¸¥§¥¯¥È¤Ï°Ê²¼¤Î¾ò·ï¤ò |
|
Ëþ¤¿¤¹¤³¤È¤òÍ׵ᤵ¤ì¤ë¡£ |
|
|
|
¤Þ¤º¡¢¤½¤Î cmo\_list ¥ª¥Ö¥¸¥§¥¯¥È¤Ï¾¯¤Ê¤¯¤È¤â¥ê¥¹¥ÈŤ¬ 3 °Ê¾å¤Ç¤Ê¤±¤ì¤Ð |
|
¤Ê¤é¤Ê¤¤¡£ |
|
|
\[ \begin{tabular}{|c|c|c|} \hline |
\[ \begin{tabular}{|c|c|c|} \hline |
$A$ & $B$ & $C$ \\ \hline |
$A$ & $B$ & $C$ \\ \hline |
\end{tabular} \] |
\end{tabular} \] |
|
|
ºÇ½é¤ÎÍ×ÁÇ $A$ ¤ÎÉôʬ¤Ï°Ê²¼¤Î¿Þ¤Î¤è¤¦¤Ê¥ê¥¹¥È¹½Â¤¤ò¤·¤Æ¤ª¤ê¡¢ |
Âè°ìÍ×ÁÇ $A$ ¤Ï¤Þ¤¿ cmo\_list ¤Ç¤¢¤ê¡¢¥ê¥¹¥ÈĹ¤Ï 4 °Ê¾å¡¢ |
$a_1$ ¤Ï 32 ¥Ó¥Ã¥ÈÀ°¿ô¤Ç¥Ð¡¼¥¸¥ç¥ó¥Ê¥ó¥Ð¡¼¤ò¡¢ |
$a_1$ ¤Ï 32 ¥Ó¥Ã¥ÈÀ°¿ô¤Ç¥Ð¡¼¥¸¥ç¥ó¥Ê¥ó¥Ð¡¼¤ò¡¢ |
$a_2$ ¤Ïʸ»úÎó¤Ç¥·¥¹¥Æ¥à¤Î̾Á°¤òɽ¤¹¤³¤È¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
$a_2$ ¤Ïʸ»úÎó¤Ç¥·¥¹¥Æ¥à¤Î̾Á°¤òɽ¤¹¤³¤È¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
|
|
Line 344 $c_{i2}$ ¤Ï°Ê²¼¤Î¿Þ¤Î¤è¤¦¤Ê¥ê¥¹¥È¹½Â¤¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
|
Line 467 $c_{i2}$ ¤Ï°Ê²¼¤Î¿Þ¤Î¤è¤¦¤Ê¥ê¥¹¥È¹½Â¤¤Ë¤Ê¤Ã¤Æ¤¤¤ë¡£ |
|
%»ý¤Ä¥ê¥¹¥È¹½Â¤¤ò {\tt [$a_1$, $a_2$, $\cdots$, $a_n$]} ¡¢ |
%»ý¤Ä¥ê¥¹¥È¹½Â¤¤ò {\tt [$a_1$, $a_2$, $\cdots$, $a_n$]} ¡¢ |
%ʸ»úÎó ``string'' ¤ò {\tt "string"} ¡¢ 32 bit À°¿ô¤ò |
%ʸ»úÎó ``string'' ¤ò {\tt "string"} ¡¢ 32 bit À°¿ô¤ò |
%¤½¤ì¤ËÂбþ¤¹¤ë 10 ¿Ê¿ô¤ÎÀ°¿ô¤Ç¼¨¤¹¡£ |
%¤½¤ì¤ËÂбþ¤¹¤ë 10 ¿Ê¿ô¤ÎÀ°¿ô¤Ç¼¨¤¹¡£ |
̾Á°¤¬ ``ox\_test'' ¡¢¥Ð¡¼¥¸¥ç¥ó¥Ê¥ó¥Ð¡¼¤¬ 199911250 ¤Î¥µ¡¼¥Ð¤Ç¤¢¤ì¤Ð¡¢ |
̾Á°¤¬ ``ox\_test''¡¢¥Ð¡¼¥¸¥ç¥ó¥Ê¥ó¥Ð¡¼¤¬ 199911250 ¤Î¥µ¡¼¥Ð¤Ç¤¢¤ì¤Ð¡¢ |
$A$ ¤ÎÉôʬ¤Ï |
$A$ ¤ÎÉôʬ¤Ï |
\begin{tabular}{|c|c|} \hline |
\begin{tabular}{|c|c|} \hline |
199911250 & "ox\_test" \\ \hline |
199911250 & "ox\_test" \\ \hline |
|
|
¤È¤Ê¤ê¡¢ |
¤È¤Ê¤ê¡¢ |
CMO ·Á¼°¤Î 32 ¥Ó¥Ã¥ÈÀ°¿ô¡¢Ê¸»úÎó¡¢ mathcap ¡¢¥ê¥¹¥È¹½Â¤¤Î¤ß¤¬ |
CMO ·Á¼°¤Î 32 ¥Ó¥Ã¥ÈÀ°¿ô¡¢Ê¸»úÎó¡¢ mathcap ¡¢¥ê¥¹¥È¹½Â¤¤Î¤ß¤¬ |
¼õ¤±¼è¤ì¤ë¤È¤¤Ë¤Ï¡¢ $C$ ¤ÎÉôʬ¤Ï |
¼õ¤±¼è¤ì¤ë¤È¤¤Ë¤Ï¡¢ $C$ ¤ÎÉôʬ¤Ï |
|
|
\begin{tabular}{|c|} \hline |
\begin{tabular}{|c|} \hline |
\\[-5mm] |
\\[-5mm] |
\begin{tabular}{|c|c|} \hline |
\begin{tabular}{|c|c|} \hline |
Line 369 CMO ·Á¼°¤Î 32 ¥Ó¥Ã¥ÈÀ°¿ô¡¢Ê¸»úÎó¡¢ mathcap ¡¢¥ê¥¹¥È¹½Â |
|
Line 491 CMO ·Á¼°¤Î 32 ¥Ó¥Ã¥ÈÀ°¿ô¡¢Ê¸»úÎó¡¢ mathcap ¡¢¥ê¥¹¥È¹½Â |
|
CMO\_INT32 & CMO\_STRING & CMO\_MATHCAP & CMO\_LIST \\ \hline |
CMO\_INT32 & CMO\_STRING & CMO\_MATHCAP & CMO\_LIST \\ \hline |
\end{tabular} \\[0.8mm] \hline |
\end{tabular} \\[0.8mm] \hline |
\end{tabular} \\[1.4mm] \hline |
\end{tabular} \\[1.4mm] \hline |
\end{tabular} |
\end{tabular} \\ |
|
|
¤È¤Ê¤ë¡£ |
¤È¤Ê¤ë¡£ |
CMO\_ZZ ¤¬¤Ê¤¤¤Î¤Ç¡¢¤³¤Î¥µ¡¼¥Ð¤Ï¿ÇÜĹÀ°¿ô¤¬ |
CMO\_ZZ ¤¬¤Ê¤¤¤Î¤Ç¡¢¤³¤Î¥µ¡¼¥Ð¤Ï¿ÇÜĹÀ°¿ô¤¬Á÷¤é¤ì¤Æ¤³¤Ê¤¤¤³¤È¤ò´üÂÔ¤·¤Æ |
Á÷¤é¤ì¤Æ¤³¤Ê¤¤¤³¤È¤ò´üÂÔ¤·¤Æ¤¤¤ë¡£ |
¤¤¤ë¡£ |
|
|
¤Ê¤ª¡¢¥Ç¡¼¥¿¤¬¼õ¤±¼è¤ì¤ë¤³¤È¤È¡¢ |
¤Ê¤ª¡¢¥Ç¡¼¥¿¤¬¼õ¤±¼è¤ì¤ë¤³¤È¤È¡¢¥Ç¡¼¥¿¤ÎÏÀÍý¹½Â¤¤¬Íý²ò¤Ç¤¤ë¤³¤È¤È¤Ï¤Þ¤Ã |
¥Ç¡¼¥¿¤ÎÏÀÍý¹½Â¤¤¬Íý²ò¤Ç¤¤ë¤³¤È¤È¤Ï¤Þ¤Ã¤¿¤¯ÊÌʪ¤Ç¤¢¤ë¤Î¤Ç |
¤¿¤¯ÊÌʪ¤Ç¤¢¤ë¤Î¤ÇÃí°Õ¤¹¤ëɬÍפ¬¤¢¤ë¡£ |
Ãí°Õ¤¹¤ëɬÍפ¬¤¢¤ë¡£ |
|
|
|
|
{\Huge ¤Ã¤Æ¤Ê¤ó¤Ç¤Ç¤·¤ç¤¦¤«? ¥Ç¡¼¥¿¤ÎÏÀÍý¹½Â¤¤òÃΤé¤Ê¤¤¤È¼õ¤±¼è¤ì¤Ê¤¤¤È |
|
»×¤¦¤ó¤Ç¤¹¤¬$\ldots$} |
|
|
|
|
\section{¥»¥¥å¥ê¥Æ¥£Âкö} |
\section{¥»¥¥å¥ê¥Æ¥£Âкö} |
|
|
OpenXM µ¬Ìó¤Ï TCP/IP ¤òÍѤ¤¤ÆÄÌ¿®¤ò¹Ô¤¦¤³¤È¤ò¹Íθ¤·¤Æ¤¤¤ë¡£ |
OpenXM µ¬Ìó¤Ï TCP/IP ¤òÍѤ¤¤ÆÄÌ¿®¤ò¹Ô¤¦¤³¤È¤ò¹Íθ¤·¤Æ¤¤¤ë¡£¥Í¥Ã¥È¥ï¡¼¥¯ |
¥Í¥Ã¥È¥ï¡¼¥¯¤Ë¤è¤Ã¤ÆÀܳ¤µ¤ì¤ë¸½Âå¤Î¿¤¯¤Î¥½¥Õ¥È¥¦¥§¥¢¤ÈƱÍÍ¡¢ |
¤Ë¤è¤Ã¤ÆÀܳ¤µ¤ì¤ë¸½Âå¤Î¿¤¯¤Î¥½¥Õ¥È¥¦¥§¥¢¤ÈƱÍÍ¡¢OpenXM µ¬Ìó¤â¤Þ¤¿ÄÌ¿® |
OpenXM µ¬Ìó¤â¤Þ¤¿ÄÌ¿®»þ¤Î¥»¥¥å¥ê¥Æ¥£¤Ë¤Ä¤¤¤ÆÃí°Õ¤·¤Æ¤¤¤ë¡£ |
»þ¤Î¥»¥¥å¥ê¥Æ¥£¤Ë¤Ä¤¤¤ÆÃí°Õ¤·¤Æ¤¤¤ë¡£°Ê²¼¡¢¤³¤Î¤³¤È¤Ë¤Ä¤¤¤ÆÀâÌÀ¤·¤è¤¦¡£ |
°Ê²¼¡¢¤³¤Î¤³¤È¤Ë¤Ä¤¤¤ÆÀâÌÀ¤·¤è¤¦¡£ |
|
|
|
{\large\bf °ÕÌ£ÉÔÌÀ¤Ê¤³¤È¤ò½ñ¤¤¤Æ¤¤¤ë¤¬¡¢} |
{\large\bf °ÕÌ£ÉÔÌÀ¤Ê¤³¤È¤ò½ñ¤¤¤Æ¤¤¤ë¤¬¡¢} |
|
|
Line 403 OpenXM µ¬Ìó¤â¤Þ¤¿ÄÌ¿®»þ¤Î¥»¥¥å¥ê¥Æ¥£¤Ë¤Ä¤¤¤ÆÃí°Õ¤·¤Æ¤ |
|
Line 525 OpenXM µ¬Ìó¤â¤Þ¤¿ÄÌ¿®»þ¤Î¥»¥¥å¥ê¥Æ¥£¤Ë¤Ä¤¤¤ÆÃí°Õ¤·¤Æ¤ |
|
¤³¤Î¥Ñ¥¹¥ï¡¼¥É¤Ï°ìö»ÈÍѤµ¤ì¤ì¤Ð̵¸ú¤Ë¤¹¤ë¤Î¤Ç¡¢ |
¤³¤Î¥Ñ¥¹¥ï¡¼¥É¤Ï°ìö»ÈÍѤµ¤ì¤ì¤Ð̵¸ú¤Ë¤¹¤ë¤Î¤Ç¡¢ |
¤â¤·²¾¤Ë¤Ê¤ó¤é¤«¤Î¼êÃʤǥѥ¹¥ï¡¼¥É¤¬±Ì¤ì¤¿¤È¤·¤Æ¤â°ÂÁ´¤À¤È¹Í¤¨¤Æ¤¤¤ë¡£ |
¤â¤·²¾¤Ë¤Ê¤ó¤é¤«¤Î¼êÃʤǥѥ¹¥ï¡¼¥É¤¬±Ì¤ì¤¿¤È¤·¤Æ¤â°ÂÁ´¤À¤È¹Í¤¨¤Æ¤¤¤ë¡£ |
|
|
%¤Ê¤ª¡¢¾åµ¤Î¥Ý¡¼¥ÈÈÖ¹æ¤È¥Ñ¥¹¥ï¡¼¥É¤Ï°ÂÁ´¤Ê¼êÃʤÇÁ÷¤é¤ì¤Æ |
|
%¤¤¤ë¤È²¾Äꤷ¤Æ¤¤¤ë¡£ |
|
%¤Þ¤¿¡¢Æ±°ì¤Î¥³¥ó¥Ô¥å¡¼¥¿¾å¤Ë°°Õ¤Î¤¢¤ë¥æ¡¼¥¶¤Ï¤¤¤Ê¤¤¤È²¾Äꤷ¤Æ¤¤¤ë |
|
%¤³¤È¤ËÃí°Õ¤·¤Ê¤±¤ì¤Ð¤Ê¤é¤Ê¤¤¡£ |
|
%¤Ê¤¼¤Ê¤é¡¢¸½ºß¤Î¼ÂÁõ¤Ç¤Ï¥µ¡¼¥Ð¡¢¤ª¤è¤Ó¥¯¥é¥¤¥¢¥ó¥È¤ÎÆ°ºî¤·¤Æ¤¤¤ë |
|
%¥³¥ó¥Ô¥å¡¼¥¿¾å¤Ç¤Ï¤³¤Î¥Ý¡¼¥ÈÈÖ¹æ¤È¥Ñ¥¹¥ï¡¼¥É¤¬¤ï¤«¤Ã¤Æ¤·¤Þ¤¦¤¿¤á¤Ç¤¢¤ë¡£ |
|
|
|
¤Ê¤ª¡¢Àܳ¤¬³ÎΩ¤·¤¿¸å¤Î¥á¥Ã¥»¡¼¥¸¤ÎÁ÷¼õ¿®¤Ë´Ø¤·¤Æ¤Ï¡¢ |
¤Ê¤ª¡¢Àܳ¤¬³ÎΩ¤·¤¿¸å¤Î¥á¥Ã¥»¡¼¥¸¤ÎÁ÷¼õ¿®¤Ë´Ø¤·¤Æ¤Ï¡¢ |
Æä˰Ź沽¤Ê¤É¤Î½èÃÖ¤ò¹Ô¤Ã¤Æ¤¤¤ë¤ï¤±¤Ç¤Ï¤Ê¤¤¡£ |
Æä˰Ź沽¤Ê¤É¤Î½èÃÖ¤ò¹Ô¤Ã¤Æ¤¤¤ë¤ï¤±¤Ç¤Ï¤Ê¤¤¡£ |
¤â¤·É¬Íפ¬¤¢¤ì¤Ð¡¢ÄÌ¿®Ï©¤Î°Å¹æ²½¤ò¹Ô¤Ê¤¦µ¡Ç½¤¬¤¢¤ë |
¤â¤·É¬Íפ¬¤¢¤ì¤Ð¡¢ÄÌ¿®Ï©¤Î°Å¹æ²½¤ò¹Ô¤Ê¤¦µ¡Ç½¤¬¤¢¤ë |
Line 419 OpenXM µ¬Ìó¤â¤Þ¤¿ÄÌ¿®»þ¤Î¥»¥¥å¥ê¥Æ¥£¤Ë¤Ä¤¤¤ÆÃí°Õ¤·¤Æ¤ |
|
Line 534 OpenXM µ¬Ìó¤â¤Þ¤¿ÄÌ¿®»þ¤Î¥»¥¥å¥ê¥Æ¥£¤Ë¤Ä¤¤¤ÆÃí°Õ¤·¤Æ¤ |
|
|
|
¾¤Î¥×¥í¥¸¥§¥¯¥È¤Ë¤Ä¤¤¤Æ¤â¿¨¤ì¤Æ¤ª¤³¤¦¡£ |
¾¤Î¥×¥í¥¸¥§¥¯¥È¤Ë¤Ä¤¤¤Æ¤â¿¨¤ì¤Æ¤ª¤³¤¦¡£ |
|
|
OpenMath ¥×¥í¥¸¥§¥¯¥È¤Ï¿ô³ØŪ¤Ê¥ª¥Ö¥¸¥§¥¯¥È¤ò |
\begin{itemize} |
¥³¥ó¥Ô¥å¡¼¥¿¾å¤Çɽ¸½¤¹¤ëÊýË¡¤ò·èÄꤷ¤Æ¤¤¤ë¡£ |
\item OpenMath\\ |
³Æ¥½¥Õ¥È¥¦¥§¥¢´Ö¤Ç¥ª¥Ö¥¸¥§¥¯¥È¤ò¸ò´¹¤¹¤ëºÝ¤Î |
OpenMath ¥×¥í¥¸¥§¥¯¥È¤Ï¿ô³ØŪ¤Ê¥ª¥Ö¥¸¥§¥¯¥È¤ò¥³¥ó¥Ô¥å¡¼¥¿¾å¤Çɽ¸½¤¹¤ëÊý |
¥ª¥Ö¥¸¥§¥¯¥È¤ÎÊÑ´¹¼ê½ç¤Ë¤Ä¤¤¤Æ¤â½Ò¤Ù¤é¤ì¤Æ¤¤¤ë¡£ |
Ë¡¤òµ¬Äꤷ¤Æ¤¤¤ë¡£³Æ¥½¥Õ¥È¥¦¥§¥¢´Ö¤Ç¥ª¥Ö¥¸¥§¥¯¥È¤ò¸ò´¹¤¹¤ëºÝ¤Î¥ª¥Ö¥¸¥§¥¯ |
ɽ¸½ÊýË¡¤Ï°ì¤Ä¤À¤±¤Ç¤Ê¤¯¡¢ XML ɽ¸½¤ä binary ɽ¸½¤Ê¤É¤¬ |
¥È¤ÎÊÑ´¹¼ê½ç¤Ë¤Ä¤Æ¤âÄê¤á¤é¤ì¤Æ¤¤¤ë¡£É½¸½ÊýË¡¤Ï´ö¤Ä¤«¤ÎÃʳ¬¤ÇÄê¤á¤é¤ì¤Æ |
ÍÑ°Õ¤µ¤ì¤Æ¤¤¤ë¡£ |
¤¤¤Æ¡¢XML ɽ¸½¤ä¥Ð¥¤¥Ê¥êɽ¸½¤Ê¤É¤¬ÍÑ°Õ¤µ¤ì¤Æ¤¤¤ë¡£¾ÜºÙ¤Ï |
¾ÜºÙ¤Ï |
|
|
|
http://www.openmath.org/omsoc/index.html A.M.Cohen |
http://www.openmath.org/omsoc/ A.M.Cohen |
|
|
|
\item NetSolve |
|
|
°Ê²¼¤Ï½ñ¤¤¤Æ¤ëÅÓÃæ¡£ |
|
|
|
NetSolve |
|
|
|
http://www.cs.utk.edu/netsolve/ |
http://www.cs.utk.edu/netsolve/ |
|
|
|
\item MP |
|
|
MP |
|
|
|
http://symbolicNet.mcs.kent.edu/SN/areas/protocols/mp.html |
http://symbolicNet.mcs.kent.edu/SN/areas/protocols/mp.html |
|
|
|
\item MCP |
|
|
MCP |
|
|
|
http://horse.mcs.kent.edu/~pwang/ |
http://horse.mcs.kent.edu/~pwang/ |
|
\end{itemize} |
|
|
|
|
\section{¸½ºßÄ󶡤µ¤ì¤Æ¤¤¤ë¥½¥Õ¥È¥¦¥§¥¢} |
\section{¸½ºßÄ󶡤µ¤ì¤Æ¤¤¤ë¥½¥Õ¥È¥¦¥§¥¢} |
|
|
¸½ºß OpenXM µ¬³Ê¤ËÂбþ¤·¤Æ¤¤¤ë¥¯¥é¥¤¥¢¥ó¥È¤Ë¤Ï |
¸½ºß OpenXM µ¬Ìó¤ËÂбþ¤·¤Æ¤¤¤ë¥¯¥é¥¤¥¢¥ó¥È¤Ë¤Ïasir, sm1, Mathematica ¤¬ |
asir, sm1, Mathematica ¤¬¤¢¤ë¡£ |
¤¢¤ë¡£¤³¤ì¤é¤Î¥¯¥é¥¤¥¢¥ó¥È¤«¤é OpenXM µ¬Ìó¤ËÂбþ¤·¤¿¥µ¡¼¥Ð¤ò¸Æ¤Ó½Ð¤¹¤³¤È |
¤³¤ì¤é¤Î¥¯¥é¥¤¥¢¥ó¥È¤«¤é |
¤¬¤Ç¤¤ë¡£¸½ºß OpenXM µ¬Ìó¤ËÂбþ¤·¤Æ¤¤¤ë¥µ¡¼¥Ð¥½¥Õ¥È¥¦¥§¥¢¤Ë¤Ï¡¢asir, |
OpenXM µ¬³Ê¤ËÂбþ¤·¤¿¥µ¡¼¥Ð¤ò¸Æ¤Ó½Ð¤¹¤³¤È¤¬¤Ç¤¤ë¡£ |
sm1, gnuplot, Mathematica ¤Ê¤É¤¬¤¢¤ê¡¢¤½¤ì¤¾¤ì ox\_asir, ox\_sm1, |
¸½ºß OpenXM µ¬Ìó¤ËÂбþ¤·¤Æ¤¤¤ë¥µ¡¼¥Ð¥½¥Õ¥È¥¦¥§¥¢¤Ë¤Ï¡¢ |
ox\_sm1\_gnuplot, ox\_math ¤È¤¤¤¦Ì¾Á°¤ÇÄ󶡤µ¤ì¤Æ¤¤¤ë¡£¤Þ¤¿¡¢ OpenMath |
asir, sm1, gnuplot, Mathematica ¤Ê¤É¤¬¤¢¤ê¡¢ |
µ¬Ìó¤Î XML ɽ¸½¤Çɽ¸½¤µ¤ì¤¿¥ª¥Ö¥¸¥§¥¯¥È¤È CMO ·Á¼°¤Î¥ª¥Ö¥¸¥§¥¯¥È¤òÊÑ´¹¤¹ |
¤½¤ì¤¾¤ì ox\_asir, ox\_sm1, ox\_sm1\_gnuplot, ox\_math |
¤ë¥½¥Õ¥È¥¦¥§¥¢¤¬ JAVA ¤Ë¤è¤Ã¤Æ¼ÂÁõ¤µ¤ì¤Æ¤ª¤ê¡¢OMproxy ¤È¤¤¤¦Ì¾Á°¤ÇÄ󶡤µ |
¤È¤¤¤¦Ì¾Á°¤ÇÄ󶡤µ¤ì¤Æ¤¤¤ë¡£ |
¤ì¤Æ¤¤¤ë¡£ |
¤Þ¤¿¡¢ OpenMath µ¬³Ê¤Î XML ɽ¸½¤Çɽ¸½¤µ¤ì¤¿¥ª¥Ö¥¸¥§¥¯¥È¤È CMO ·Á¼°¤Î |
|
¥ª¥Ö¥¸¥§¥¯¥È¤òÊÑ´¹¤¹¤ë¥½¥Õ¥È¥¦¥§¥¢¤¬ JAVA ¤Ë¤è¤Ã¤Æ¼ÂÁõ¤µ¤ì¤Æ¤ª¤ê¡¢ |
|
OMproxy ¤È¤¤¤¦Ì¾Á°¤ÇÄ󶡤µ¤ì¤Æ¤¤¤ë¡£ |
|
|
|
\begin{thebibliography}{99} |
\begin{thebibliography}{99} |
|
\bibitem{Ohara-Takayama-Noro-1999} |
|
¾®¸¶¸ùǤ, ¹â»³¿®µ£, ÌîϤÀµ¹Ô: |
|
{Open asir ÆþÌç}, 1999, ¿ô¼°½èÍý, Vol 7, No 2, 2--17. (ISBN4-87243-086-7, SEG ½ÐÈÇ, Tokyo). |
\bibitem{OpenXM-1999} |
\bibitem{OpenXM-1999} |
ÌîϤÀµ¹Ô, ¹â»³¿®µ£: |
ÌîϤÀµ¹Ô, ¹â»³¿®µ£: |
{Open XM ¤ÎÀ߷פȼÂÁõ --- Open message eXchange protocol for Mathematics}, |
{Open XM ¤ÎÀ߷פȼÂÁõ --- Open message eXchange protocol for Mathematics}, |
1999/11/22 |
1999/11/22 |
\bibitem{Ohara-Takayama-Noro-1999} |
|
¾®¸¶¸ùǤ, ¹â»³¿®µ£, ÌîϤÀµ¹Ô: |
|
{Open asir ÆþÌç}, 1999, ¿ô¼°½èÍý, Vol 7, No 2, 2--17. (ISBN4-87243-086-7, SEG ½ÐÈÇ, Tokyo). |
|
\end{thebibliography} |
\end{thebibliography} |
|
|
\end{document} |
\end{document} |