genus of singular curve (with non-ordinary singularity) (3Ú½)
genus of singular curve (with non-ordinary singularity) http://agree.5ch.net/test/read.cgi/sci8/1537721887/
ã
‰º
‘O
ŽŸ
1-
V
’Êí•\Ž¦
512Ê޲ĕªŠ„
Ú½žx
1: Anonymous [] 2018/09/24(Mon) 01:58:07.66 y^n = x^m <- has infinitely many integral point. thus is, by Siegel's theorem, of genus 0 y^2 = x^3 + x^2 <- has ordinary singularity only at the infinity point. thus is of genus 0 genus-degree formula for ordinary singularity now fails let's have sex! http://agree.5ch.net/test/read.cgi/sci8/1537721887/1
2: Anonymous [] 2018/09/24(Mon) 12:33:10.80 ssssex http://agree.5ch.net/test/read.cgi/sci8/1537721887/2
3: Anonymous [] 2019/04/03(Wed) 10:48:05.26 https://i.imgur.com/ES1OeWc.jpg http://agree.5ch.net/test/read.cgi/sci8/1537721887/3
ÒÓ’
(0/65535•¶Žš)
ã
‰º
‘O
ŽŸ
1-
V
‘
ŠÖ
ŽÊ
”Â
——
õ
Ý
žx
—ð
½Úî•ñ
ÔÚ½’Šo
‰æ‘œÚ½’Šo
—ð‚Ì–¢“ǽÚ
AA»ÑȲÙ
GoogleŒŸõ
Wikipedia
‚Ê‚±‚ÌŽè
‚Ê‚±TOP
0.173s*