Ranks of rational points of the Jacobian varieties of hyperelliptic curves

Abstract

In this paper, we obtain bounds for the Mordell-Weil ranks over cyclotomic extensions of a wide range of abelian varieties defined over a number field F whose primes above p are totally ramified over F/Q. We assume that the abelian varieties may have good non-ordinary reduction at those primes. Our work is a generalization of Kim, in which the second author generalized Perrin-Riou's Iwasawa theory for elliptic curves over Q with supersingular reduction (Perrin-Riou) to elliptic curves defined over the above-mentioned number field F. On top of non-ordinary reduction and the ramification of the field F, we deal with the additional difficulty that the dimensions of the abelian varieties can be any number bigger than 1 which causes a variety of issues. As a result, we obtain bounds for the ranks over cyclotomic extensions Q(μp(M,N)+n) of the Jacobian varieties of ramified hyperelliptic curves y2pM=x3pN+axpN+b among others.