Explicit examples of equivalence relations and factors with prescribed fundamental group and outer automorphism group

Abstract

In this paper we give a number of explicit constructions for II1 factors and II1 equivalence relations that have prescribed fundamental group and outer automorphism group. We construct factors and relations that have uncountable fundamental group different from . In fact, given any II1 equivalence relation, we construct a II1 factor with the same fundamental group. Given any locally compact unimodular second countable group G, our construction gives a II1 equivalence relation whose outer automorphism group is G. The same construction does not give a II1 factor with G as outer automorphism group, but when G is a compact group or if G=n=\g∈n (g)=1\, then we still find a type II1 factor whose outer automorphism group is G.