Quantum permutation groups

Abstract

The permutation group SN has a quantum analogue SN+, which is infinite at N≥4. We review the known facts regarding SN+, and notably its easiness property, Weingarten calculus, and the isomorphism S4+=SO3-1 and its consequences. We discuss then the structure of the closed subgroups G⊂ SN+, and notably of the quantum symmetry groups of finite graphs G+(X)⊂ SN+, with particular attention to the quantum reflection groups HNs+. We also discuss, more generally, the quantum symmetry groups SZ+ of the finite quantum spaces Z, and their closed subgroups G⊂ SZ+, with particular attention to the quantum graph case, and to quantum reflection groups.