On the local constancy of certain mod p Galois representations

Abstract

In this article we study local constancy of the mod p reduction of certain 2-dimensional crystalline representations of Gal(Qp/Qp) using the mod p local Langlands correspondence. We prove local constancy in the weight space by giving an explicit lower bound on the local constancy radius centered around weights going up to (p-1)2 +3 and the slope fixed in (0, \ p-1) satisfying certain constraints. We establish the lower bound by determining explicitly the mod p reductions at nearby weights and applying a local constancy result of Berger.