Natural maps for measurable cocycles of compact hyperbolic manifolds

Abstract

Let G(n) be equal either to PO(n,1),PU(n,1) or PSp(n,1) and let ≤ G(n) be a uniform lattice. Denote by HnK the hyperbolic space associated to G(n), where K is a division algebra over the reals of dimension d=R K. Assume d(n-1) ≥ 2. In this paper we generalize natural maps to measurable cocycles. Given a standard Borel probability -space (X,μX), we assume that a measurable cocycle σ: × X → G(m) admits an essentially unique boundary map φ:∂∞ HnK × X → ∂∞ HmK whose slices φx:HnK → HmK are atomless for almost every x ∈ X. Then, there exists a σ-equivariant measurable map F: HnK × X → HmK whose slices Fx:HnK → HmK are differentiable for almost every x ∈ X and such that Jaca Fx ≤ 1 for every a ∈ HnK and almost every x ∈ X. The previous properties allow us to define the natural volume NV(σ) of the cocycle σ. This number satisfies the inequality NV(σ) ≤ Vol( HnK). Additionally, the equality holds if and only if σ is cohomologous to the cocycle induced by the standard lattice embedding i: → G(n) ≤ G(m), modulo possibly a compact subgroup of G(m) when m>n. Given a continuous map f:M → N between compact hyperbolic manifolds, we also obtain an adaptation of the mapping degree theorem to this context.