Rigidity of the Reducibility of Gevrey Quasi-periodic Cocycles on U(n)

Abstract

We consider the reducibility problem of cocycles (α,A) on d× U(n) in Gevrey classes, where α is a Diophantine vector. We prove that, if a Gevrey cocycle is conjugated to a constant cocycle (α,C) by a suitable measurable conjugacy (0,B), then for almost all C it can be conjugated to (α,C) in the same Gevrey class, provided that A is sufficiently close to a constant. If B is continuous we obtain it is Gevrey smooth. We consider as well the global problem of reducibility in Gevrey classes when d=1.