Equivariant maps for measurable cocycles with values into higher rank Lie groups

Abstract

Let G a semisimple Lie group of non-compact type and let XG be the Riemannian symmetric space associated to it. Suppose XG has dimension n and it has no factor isometric to either H2 or SL(3,R)/SO(3). Given a closed n-dimensional Riemannian manifold N, let =π1(N) be its fundamental group and Y its universal cover. Consider a representation : → G with a measurable -equivariant map :Y → XG. Connell-Farb described a way to construct a map F:Y→ XG which is smooth, -equivariant and with uniformly bounded Jacobian. In this paper we extend the construction of Connell-Farb to the context of measurable cocycles. More precisely, if (,μ) is a standard Borel probability -space, let σ: × → G be a measurable cocycle. We construct a measurable map F: Y × → XG which is σ-equivariant, whose slices are smooth and they have uniformly bounded Jacobian. For such equivariant maps we define also the notion of volume and we prove a sort of mapping degree theorem in this particular context.