Inducing braces and Hopf Galois structures

Abstract

Let p be a prime number and let n be an integer not divisible by p and such that every group of order np has a normal subgroup of order p. (This holds in particular for p>n.) We prove that left braces of size np may be obtained as a semidirect product of the unique left brace of size p and a left brace of size n. We give a method to determine all braces of size np from the braces of size n and certain classes of morphisms from the multiplicative group of these braces of size n to Zp*. From it we derive a formula giving the number of Hopf Galois structures of abelian type Zp × E on a Galois extension of degree np in terms of the number of Hopf Galois structures of abelian type E on a Galois extension of degree n. For a prime number p≥ 7, we apply the obtained results to describe all left braces of size 12p and determine the number of Hopf Galois structures of abelian type on a Galois extension of degree 12p.