On the Galois correspondence for Hopf Galois structures arising from finite radical algebras and Zappa-Sz\'ep products

Abstract

Let L/K be a G-Galois extension of fields with an H-Hopf Galois structure of type N. We study the ratio GC(G, N), which is the number of intermediate fields E with K ⊂eq E ⊂eq L that are in the image of the Galois correspondence for the H-Hopf Galois structure on L/K, divided by the number of intermediate fields. By Galois descent, L K H = LN where N is a G-invariant regular subgroup of Perm(G), and then GC(G, N) is the number of G-invariant subgroups of N, divided by the number of subgroups of G. We look at the Galois correspondence ratio for a Hopf Galois structure by translating the problem into counting certain subgroups of the corresponding skew brace. We look at skew braces arising from finite radical algebras A and from Zappa-Sz\'ep products of finite groups, and in particular when A3 = 0 or the Zappa-Sz\'ep product is a semidirect product, in which cases the corresponding skew brace is a bi-skew brace, that is, a set G with two group operations and in such a way that G is a skew brace with either group structure acting as the additive group of the skew brace. We obtain the Galois correspondence ratio for several examples. In particular, if (G, , ) is a bi-skew brace of squarefree order 2m where (G, ) Z2m is cyclic and (G, ) = Dm is dihedral, then for large m, GC(Z2m,Dm), is close to 1/2 while GC(Dm, Z2m) is near 0.