Quantum hypergroups arising from ergodic coactions
Abstract
Given a compact quantum group G and an ergodic action L∞(X)α G with algebraic core O(X), we show that the unital *-algebra O(X×G X):= O(X)O(X) carries the structure of an algebraic compact quantum hypergroup. This *-algebra admits two (generally distinct) C*-algebra completions (`reduced' and `universal'), both carrying the structure of a C*-algebraic compact quantum hypergroup. This provides a large class of new examples of (analytical) compact quantum hypergroups. We provide characterizations of coamenability for these compact quantum hypergroups, making use of the theory of equivariant correspondences.
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