Divergence of Morse geodesics

Abstract

Behrstock and Drutu raised a question about the existence of Morse geodesics in CAT(0) spaces with divergence function strictly greater than rn and strictly less than rn+1, where n is an integer greater than 1. In this paper, we answer the question of Behrstock and Drutu by showing that for each real number s≥ 2, there is a CAT(0) space X with a proper and cocompact action of some finitely generated group such that X contains a Morse bi-infinite geodesic with the divergence equivalent to rs.