Some weighted group algebras are operator algebras

Abstract

Let G be a finitely generated group with polynomial growth, and let be a weight, i.e. a sub-multiplicative function on G with positive values. We study when the weighted group algebra 1(G,) is isomorphic to an operator algebra. We show that 1(G,) is isomorphic to an operator algebra if is a polynomial weight with large enough degree or an exponential weight of order 0<α<1. We will demonstrate the order of growth of G plays an important role in this question. Moreover, the algebraic centre of 1(G,) is isomorphic to a Q-algebra and hence satisfies a multi-variable von Neumann inequality. We also present a more detailed study of our results when G is the d-dimensional integers d and 3-dimensional discrete Heisenberg group H3(). The case of the free group with two generators will be considered as a counter example of groups with exponential growth.