A central limit theorem in the framework of the Thompson group F
Abstract
We discuss a central limit theorem in the framework of the group algebra of the Thompson group F. We consider the sequence of self-adjoint elements given by an=gn+gn*2 in the noncommutative probability space (C(F),), where the expectation functional is the trace associated to the left regular representation of F, and the gn-s are the generators of F in its standard infinite presentation. We show that the limit law of the sequence sn = a0+·s+an-1n is the standard normal distribution.
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