Maximality Levels of the classical permutation group in the quantum permutation group

Abstract

Progress on the conjecture of Banica and Bichon that the classical permutation group is a maximal quantum subgroup of the quantum permutation group remains limited to a handful of small-parameter results. By Tannaka--Krein duality, any counterexample to this Maximality Conjecture must arise from a category strictly intermediate between the category NC of non-crossing partitions and the category P of all partitions. Any such exotic category must therefore contain a linear combination of crossing-partition vectors. The categories generated by NC together with some such vectors are studied, with a number of generation results. It is shown that no exotic category can contain a linear combination of three crossing-partition vectors, and, at N=6, there is no exotic category containing a linear combination of 31 crossing-partition vectors that is distinguished from NC or P at moments of order six.

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