Ideal class groups of number fields and Bloch-Kato's Tate-Shafarevich groups for symmetric powers of elliptic curves

Abstract

For an elliptic curve E over Q, putting K=Q(E[p]) which is the p-th division field of E for an odd prime p, we study the ideal class group ClK of K as a Gal(K/Q)-module. More precisely, for any j with 1≤slant j ≤slant p-2, we give a condition that ClK Fp has the symmetric power Symj E[p] of E[p] as its quotient Gal(K/Q)-module, in terms of Bloch-Kato's Tate-Shafarevich group of Symj Vp E. Here Vp E denotes the rational p-adic Tate module of E. This is a partial generalization of a result of Prasad and Shekhar for the case j=1.