-adic continuous families of Drinfeld eigenforms of finite slope

Abstract

Let p be a rational prime, vp the normalized p-adic valuation on Z, q>1 a p-power and A=Fq[t]. Let ∈ A be an irreducible polynomial and n∈ A a non-zero element which is prime to . Let k≥ 2 and r≥ 1 be integers. We denote by Sk(1(nr)) the space of Drinfeld cuspforms of level 1(nr) and weight k for A. Let n≥ 1 be an integer and a≥ 0 a rational number. Suppose that n has a prime factor of degree one and the generalized eigenspace in Sk(1(nr)) of slope a is one-dimensional. In this paper, under an assumption that a is sufficiently small, we construct a family \Fk' vp(k'-k)≥ p(pn+a)\ of Hecke eigenforms Fk'∈ Sk'(1(nr)) of slope a such that, for any Q∈ A, the Hecke eigenvalues of Fk and Fk' at Q are congruent modulo with some >pvp(k'-k)-pn-a.