Bernoulli actions of type III1 and L2-cohomology
Abstract
We conjecture that a countable group G admits a nonsingular Bernoulli action of type III1 if and only if the first L2-cohomology of G is nonzero. We prove this conjecture for all groups that admit at least one element of infinite order. We also give numerous explicit examples of type III1 Bernoulli actions of the group of integers and the free groups, with different degrees of ergodicity.
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