An explicit exotic representation of a rank-one simple Lie group via convex bodies

Abstract

In [DP12], Delzant and Py showed that there exist continuous irreducible isometric actions of PSL2(R) on the infinite-dimensional hyperbolic space H∞. Such continuous irreducible actions do not exist on the hyperbolic spaces Hn when n>2 and their associated embeddings H2 H∞ given by the orbit maps were later called exotic by Monod and Py in [MP14]. In this article, we produce a continuous and irreducible representation of PSL2(R) Isom(H∞) using the hyperbolic model for convex bodies introduced in [DF22]. This yields a convex cocompact PSL2(R)-action on the infinite-dimensional hyperbolic space H∞, of which the compact quotient over the minimal PSL2(R)-invariant convex set is homeomorphic to the 2-dimensional oriented Banach--Mazur compactum. Moreover, we study the geometry of one of its orbit maps and compute the Hausdorff dimension of the limit set of this representation.