Effect of increasing the ramification on pseudo-deformation rings

Abstract

Given a continuous, odd, semi-simple 2-dimensional representation of GQ,Np over a finite field of odd characteristic p and a prime not dividing Np, we study the relation between the universal deformation rings of the corresponding pseudo-representation for the groups GQ,N p and GQ,Np. As a related problem, we investigate when the universal pseudo-representation arises from an actual representation over the universal deformation ring. Under some hypotheses, we prove analogues of theorems of Boston and B\"ockle for the reduced pseudo-deformation rings. We improve these results when the pseudo-representation is unobstructed and p does not divide 2-1. When the pseudo-representation is unobstructed and p divides +1, we prove that the universal deformation rings in characteristic 0 and p of the pseudo-representation for GQ,N p are not local complete intersection rings. As an application of our main results, we prove a big R=T theorem.