On the Kolyvagin's formula, the Tate pairing associated to an isogeny, the local Artin map and the Hilberts symbol

Authors

  • V.I. Nesteruk Ivan Franko Lviv National University, 1 Universytetska str., 79000, Lviv, Ukraine
https://doi.org/10.15330/cmp.5.1.94-101

Keywords:

pseudolocal field, $n$-dimensional pseudolocal field, $n$-dimensional general local field, isogeny, Tate pairing associated to an isogeny, local Artin map, Hilbert symbol, Kolyvagin's formula
Published online: 2013-06-20

Abstract

A proof of nondegeneracy of the Tate pairing and Kolyvagin's formula for elliptic curves with good reductions over an $n$-dimensional $(n\leq 3)$ pseudolocal field, the Tate pairing associated to an isogeny between abelian varieties over pseudolocal field and an $n$-dimensional $(n\leq 3)$ pseudolocal field, and the relations of local Artin map and of the Hilbert symbol for an $n$-dimensional $(n\leq 3)$ general local field is given.

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How to Cite
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Nesteruk, V. On the Kolyvagin’s Formula, the Tate Pairing Associated to an Isogeny, the Local Artin Map and the Hilberts Symbol. Carpathian Math. Publ. 2013, 5, 94-101.