Hopf-Galois Structures Arising From Groups with Unique Subgroup of Order p

Abstract

For a group of order mp for p prime where gcd(p,m)=1, we consider those regular subgroups N≤ Perm() normalized by λ(), the left regular representation of . These subgroups are in one-to-one correspondence with the Hopf-Galois structures on separable field extensions L/K with =Gal(L/K). This is a follow up to the author's earlier work where, by assuming p>m, one has that all such N lie within the normalizer of the p-Sylow subgroup of λ(). Here we show that one only need assume that all groups of a given order mp have a unique p-Sylow subgroup, and that p not be a divisor of the automorphism groups of any group of order m. As such, we extend the applicability of the program for computing these regular subgroups N and concordantly the corresponding Hopf-Galois structures on separable extensions of degree mp.