Haagerup property for wreath products constructed with Thompson's groups
Abstract
Using recent techniques introduced by Jones we prove that a large family of discrete groups and groupoids have the Haagerup property. In particular, we show that if G is a discrete group with the Haagerup property, then the wreath product Q2G V obtained from the group G and the usual action of Thompson's group V on the dyadic rational Q2 of the unit interval has the Haagerup property.
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