Hopf Galois structures on separable field extensions of odd prime power degree

Abstract

A Hopf Galois structure on a finite field extension L/K is a pair (H,μ), where H is a finite cocommutative K-Hopf algebra and μ a Hopf action. In this paper, we present several results on Hopf Galois structures on odd prime power degree separable field extensions. We prove that if a separable field extension of odd prime power degree has a Hopf Galois structure of cyclic type, then it has no structure of noncyclic type. We determine the number of Hopf Galois structures of cyclic type on a separable field extension of degree pn, p an odd prime, such that the Galois group of its normal closure is a semidirect product Cpn CD of the cyclic group of order pn and a cyclic group of order D, with D prime to p. We characterize the transitive groups of degree p3 which are Galois groups of the normal closure of a separable field extension having some cyclic Hopf Galois structure and determine the number of those. We prove that if a separable field extension of degree p3 has a nonabelian Hopf Galois structure then it has an abelian structure whose type has the same exponent as the nonabelian type. We obtain that, for p>3, the two abelian noncyclic Hopf Galois structures do not occur on the same separable extension of degree p3. We present a table which gives the number of Hopf Galois structures of each possible type on a separable extension of degree 27 to illustrate that for p=3, all four noncyclic Hopf Galois structures may occur on the same extension. Finally, putting together all previous results, we list all possible sets of Hopf Galois structure types on a separable extension of degree p3, for p>3 a prime.