On p-adic L-functions of elliptic curves and the ideal class groups of the division fields
Abstract
Let E be an elliptic curve defined over Q and F be Q or an imaginary quadratic field with certain conditions. In this article, we study the ideal class group Cl(FE) of the p-division field FE:=F(E[p]) of E over F for an odd prime number p. More precisely, we investigate the non-vanishing of the E[p]-component in the semi-simplification of Cl(FE)/pCl(FE) as an Fp[Gal(FE/F)]-module when E[p] is an irreducible Gal(FE/F)-module. When the analytic rank of E over F is 1, we establish a new relationship between the non-vanishing of the E[p]-component and the p-divisibility of a certain p-adic analytic quantity associated with E. The quantity is defined by the leading coefficient of the cyclotomic p-adic L-function of E when F=Q and by that of Bertolini--Darmon--Prasanna's anticyclotomic p-adic L-function of E when F is the imaginary quadratic field.
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