Primitive normalisers in quasipolynomial time

Abstract

The normaliser problem has as input two subgroups H and K of the symmetric group Sn, and asks for a generating set for NK(H): it is not known to have a subexponential time solution. It is proved in [Roney-Dougal & Siccha, 2020] that if H is primitive then the normaliser problem can be solved in quasipolynomial time. We show that for all subgroups H and K of Sn, in quasipolynomial time we can decide whether NSn(H) is primitive, and if so compute NK(H). Hence we reduce the question of whether one can solve the normaliser problem in quasipolynomial time to the case where the normaliser is known not to be primitive.

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