On the Amenability of Compact and Discrete Hypergroup Algebras
Abstract
Let K be a commutative compact hypergroup and L1(K) the hypergroup algebra. We show that L1(K) is amenable if and only if πK, the Plancherel weight on the dual space K, is bounded. Furthermore, we show that if K is an infinite discrete hypergroup and there exists α∈ K which vanishes at infinity, then L1(K) is not amenable. In particular, L1(K) fails to be even α-left amenable if πK(\α\)=0.
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