On Shafarevich-Tate groups and analytic ranks in families of modular forms, II. Coleman families
Abstract
This is the second article in a two-part project whose aim is to study algebraic and analytic ranks in p-adic families of modular forms. Let f be a newform of weight 2, square-free level N and trivial character, let Af be the abelian variety attached to f, whose dimension will be denoted by df, and for every prime number p N let f(p) be a p-adic Coleman family through f over a suitable open disc in the p-adic weight space. We prove that, for all but finitely many primes p as above, if Af( Q) has rank r∈\0,df\ and the p-primary part of the Shafarevich-Tate group of Af over Q is finite, then all classical specializations of f(p) of weight congruent to 2 modulo 2(p-1) and trivial character have finite p-primary Shafarevich-Tate group and r/df-dimensional image of the relevant p-adic \'etale Abel-Jacobi map. As a second contribution, assuming the non-degeneracy of certain height pairings \`a la Gillet-Soul\'e between Heegner cycles, we show that, for all but finitely many p, if f has analytic rank r∈\0,1\, then all classical specializations of f(p) of weight congruent to 2 modulo 2(p-1) and trivial character have analytic rank r. This result provides some evidence for a conjecture of Greenberg on analytic ranks in families of modular forms.
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