Rigidity of convex co-compact diagonal actions

Abstract

Kleiner-Leeb and Quint showed that convex subsets in higher-rank symmetric spaces are very rigid compared to rank 1 symmetric spaces. Motivated by this, we consider convex subsets in products of proper CAT(0) spaces X1× X2 and show that for any two convex co-compact actions i() on Xi, where i=1, 2, if the diagonal action of on X1× X2 via =(1, 2) is also convex co-compact, then under a suitable condition, 1() and 2() have the same marked length spectrum.