Borel structures on the space of left-orderings

Abstract

In this paper we study the Borel structure of the space of left-orderings LO(G) of a group G modulo the natural conjugacy action, and by using tools from descriptive set theory we find many examples of countable left-orderable groups such that the quotient space LO(G)/G is not standard. This answers a question of Deroin, Navas, and Rivas. We also prove that the countable Borel equivalence relation induced from the conjugacy action of F2 on LO(F2) is universal, and leverage this result to provide many other examples of countable left-orderable groups G such that the natural G-action on LO(G) induces a universal countable Borel equivalence relation.