Invariant measures on products and on the space of linear orders

Abstract

Let M be an 0-categorical structure and assume that M has no algebraicity and has weak elimination of imaginaries. Generalizing classical theorems of de Finetti and Ryll-Nardzewski, we show that any ergodic, Aut(M)-invariant measure on [0, 1]M is a product measure. We also investigate the action of Aut(M) on the compact space LO(M) of linear orders on M. If we assume moreover that the action Aut(M) M is transitive, we prove that the action Aut(M) LO(M) either has a fixed point or is uniquely ergodic.