Galois Representations Associated to p-adic Families of Modular Forms of Finite Slope

Abstract

We define a pro-p Abelian sheaf on a modular curve of a fixed level N ≥ 5 divisible by a prime number p ≠ 2. Every p-adic representation of Gal(Q/Q) associated to an eigenform is obtained as a quotient of its \'etale cohomology. For any compact Zp[[1 + N Zp]]-algebra 1 satisfying certain suitable conditions, we construct a representation of Gal(Q/Q) over 1 associated to a 1-adic cuspidal eigenform of finite slope as a scalar extension of a quotient of the \'etale cohomology.