A note on the minimal level of realization for a mod eigenvalue system

Abstract

In this article we give a criterion for a mod eigenvalue system attached to a mod Katz cuspform to arise from lower level or weight. Namely, we prove the following: the eigenvalue system associated to a ring homomorphism f:T F from the Hecke algebra of level 1(n) and weight k to F, where is a prime not dividing n and 1≤ k ≤ +1, arises from lower level or weight if there exists a prime r dividing n such that dimF p ≠ r ( Tp-f(Tp), S(n,k)F)>1, where Tp is the p-th Hecke operator and S(n,k)F is the space of mod Katz cuspforms of level 1(n) and weight k.