Deformations of fundamental group representations and earthquakes on SO(n,1) surface groups

Abstract

In this article we construct a type of deformations of representations π1(M)→ G where G is an arbitrary lie group and M is a large class of manifolds including CAT(0) manifolds. The deformations are defined based on codimension 1 hypersurfaces with certain conditions, and also on disjoint union of such hypersurfaces, i.e. multi-hypersurfaces. We show commutativity of deforming along disjoint hypersurfaces. As application, we consider Anosov surface groups in SO(n,1) and show that the construction can be extended continuously to measured laminations, thus obtaining earthquake deformations on these surface groups.