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IUTを読むための用語集資料集スレ http://rio2016.5ch.net/test/read.cgi/math/1592654877/
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151: 現代数学の系譜 雑談 ◆yH25M02vWFhP [] 2020/07/15(水) 23:21:11.85 ID:hRRJMwM+ >>148 追加 https://mathoverflow.net/questions/2022/definition-and-meaning-of-the-conductor-of-an-elliptic-curve <mathoverflow> Definition and meaning of the conductor of an elliptic curve (抜粋) I never really understood the definition of the conductor of an elliptic curve. asked Oct 23 '09 at 3:15 Sam Derbyshire 5 Answers <39> Saito proved that Art(X/R)=ν(Δ) where Δ∈R is the ''discriminant'' of X which mesures the defect of a functorial isomorphism which involves powers of the relative dualizing sheaf of X/R. When C is an elliptic curve, one can prove that Δ is actually the discriminant of a minimal Weierstrass equation over R, and le tour est joue ! This paper of Saito was apparently not very known by the number theorists. Some more details are given in a text (in French). http://www.ufr-mi.u-bordeaux.fr/~liu/Notes/ogg.ps So Ogg's formula should be called Ogg-Saito's formula. That some people do. answered Jan 26 '10 at 22:50 Qing Liu http://rio2016.5ch.net/test/read.cgi/math/1592654877/151
152: 現代数学の系譜 雑談 ◆yH25M02vWFhP [] 2020/07/15(水) 23:28:35.83 ID:hRRJMwM+ >>151 追加 https://www.lmfdb.org/knowledge/show/ec.conductor LMFDB Conductor of an elliptic curve (reviewed) (抜粋) The conductor of an elliptic curve E defined over a number field K is an ideal of the ring of integers of K that is divisible by the prime ideals of bad reduction and no others. http://rio2016.5ch.net/test/read.cgi/math/1592654877/152
153: 現代数学の系譜 雑談 ◆yH25M02vWFhP [] 2020/07/15(水) 23:41:30.47 ID:hRRJMwM+ >>151 追加 これは、米高校生の数学ソフトによる 計算レポートだが なかなかレベル高いね https://scholarcommons.sc.edu/cgi/viewcontent.cgi?article=1194&context=jscas The Relationship between Conductor and Discriminant of an Elliptic Curve over Q Nico Adamo Heathwood Hall Episcopal School, 9th Grade, Columbia SC (抜粋) Saito (1988) establishes a relationship between two invariants associated with a smooth projective curve, the conductor and discriminant. Saito defined the conductor of an arbitrary scheme of finite type using p-adic etale cohomology. He used a definition of Deligne for the discriminant as measuring defects in a canonical isomorphism between powers of relative dualizing sheaf of smooth projective curves. The researcher in this paper uses the fact that this relationship is analogous to that of conductor to discriminant in the case of elliptic curves, Saito’s result, as well as analysis of data on conductors and discriminants to determine whether patterns exist between discriminant and conductor of elliptic curves. The researcher finds such patterns do in fact exist and discusses two main patterns: that of the conductor dividing the discriminant and that of the conductor ”branching” in a predictable way. These patterns also allow for easier algorithms for computing conductors. http://rio2016.5ch.net/test/read.cgi/math/1592654877/153
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