Invariance of the parity conjecture for p-Selmer groups of elliptic curves in a $D_{2p^n}$-extension

Details Invariance of the parity conjecture for p-Selmer groups of elliptic curves in a $D_{2p^n}$-extension Invariance of the parity conjecture for p-Selmer groups of elliptic curves in a $D_{2p^n}$-extension

2010-02-02

arxiv.org/abs/1002.0554v1

Mathematics

Number Theory

19 pages

Scientific paper

In section 2, we show a $p$-parity result in a $D_{2p^{n}}$-extension of number fields $L/K$ ($p\geq 5$) for the twist $1\oplus \eta \oplus \tau $: W(E/K,1\oplus \eta \oplus \tau)=(-1)^{< 1\oplus\eta \oplus \tau, X_{p}(E/L)>}, where $E$ is an elliptic curve over $K,$ $\eta$ and $\tau$ are respectively the quadratic character and an irreductible representation of degree 2 of $Gal(L/K)=D_{2p^{n}},$ and $X_{p}(E/L)$ is the $p$-Selmer group. The main novelty is that we use a congruence result between $% \epsilon_{0}$-factors (due to Deligne) for the determination of local root numbers in bad cases (places of additive reduction above 2 and 3). We also give applications to the $p$-parity conjecture (using the machinery of the Dokchitser brothers).

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