Selmer Groups and Torsion Zero Cycles on the Selfproduct of a Semistable Elliptic Curve
نویسندگان
چکیده
In this paper we extend the niteness result on the p-primary torsion subgroup in the Chow group of zero cycles on the selfproduct of a semistable elliptic curve obtained in joint work with S. Saito to primes p dividing the conductor. On the way we show the niteness of the Selmer group associated to the symmetric square of the elliptic curve for those primes. The proof uses p-adic techniques, in particular the Fontaine-Jannsen conjecture proven by Kato and Tsuji. 1991 Mathematics Subject Classi cation: Primary 14H52; Secondary 19E15, 14F30.
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