On the Kolyvagin's formula, the Tate pairing associated to an isogeny, the local Artin map and the Hilberts symbol
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.
How to Cite
(1)
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 (1), 94-101.
