Eisenstein series, p-adic modular functions, and overconvergence

Abstract

Let p be a prime 5. We establish explicit rates of overconvergence for members of the "Eisenstein family", notably for the p-adic modular function V(E(1,0))/E(1,0) (V the p-adic Frobenius operator) that plays a pi\-votal role in Coleman's theory of p-adic families of modular forms. The proof goes via an in-depth analysis of rates of overconvergence of p-adic modular functions of form V(Ek)/Ek where Ek is the classical Eisenstein series of level 1 and weight k divisible by p-1. Under certain conditions, we extend the latter result to a vast generalization of a theorem of Coleman--Wan regarding the rate of overconvergence of V(Ep-1)/Ep-1. We also comment on previous results in the literature. These include applications of our results for the primes 5 and 7.