Amenability constants of central Fourier algebras of finite groups
Abstract
We consider amenability constants of the central Fourier algebra ZA(G) of a finite group G. This is a dual object to ZL1(G) in the sense of hypergroup algebras, and as such shares similar amenability theory. We will provide several classes of groups where AM(ZA(G)) = AM(ZL1(G)), and discuss AM(ZA(G)) when G has two conjugacy class sizes. We also produce a new counterexample that shows that unlike AM(ZL1(G)), AM(ZA(G)) does not respect quotient groups, however the class of groups that does has 74 as the sharp amenability constant bound.
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