On some constancy of Hecke eigensystems for Drinfeld cuspforms of finite slope

Abstract

Let p be a rational prime, let q>1 be a p-power integer, let Fq be the field of q elements and let A=Fq[t] be the polynomial ring over Fq. Let n∈ A be a nonzero element and let ∈ A be a monic irreducible polynomial of positive degree. Let k≥ 2 and r≥ 1 be integers. Let Sk(Γ1(nr)) be the space of Drinfeld cuspforms of level Γ1(nr) and weight k. In this paper, we prove that the multiplicity of a Hecke eigensystem of finite -slope in Sk(Γ1(nr)) is equal to q(r-1)deg() times that in Sk(Γ1(n)). In particular, this shows that a Hecke eigensystem of finite -slope appears in Sk(Γ1(nr)) if and only if it appears in Sk(Γ1(n)).