On the Galois correspondence ratio for Hopf-Galois extensions arising from nilpotent Fp-algebras

Abstract

For a Hopf-Galois structure on a Galois extension L/K of fields that arises from a finite nilpotent Fp-algebra A, we look at the Galois correspondence ratio, which measures the failure of surjectivity of the Galois correspondence for the Hopf-Galois structure on L/K. Using methods of elementary linear algebra, we observe that the number of subgroups of the adjoint group of A is equal to the number of subgroups of the additive group of N. Then we count left ideals of A and thereby determine the GCR for all nilpotent Fp-algebras of dimension 4, and also show that for a set of Fp-algebras of arbitrary dimension n and exponent e, the GCR approaches 0 for large p, n or e.