Entropy rigidity for foliations by strictly convex projective manifolds

Abstract

Let N be a compact manifold with a foliation FN whose leaves are compact strictly convex projective manifolds. Let M be a compact manifold with a foliation FM whose leaves are compact hyperbolic manifolds of dimension bigger than or equal to 3. Suppose to have a foliation-preserving homeomorphism f:(N,FN) → (M,FM) which is C1-regular when restricted to leaves. In the previous situation there exists a well-defined notion of foliated volume entropies h(N,FN) and h(M,FM) and it holds h(M,FM) ≤ h(N,FN). Additionally, if equality holds, then the leaves must be homothetic.