The commutative inverse semigroup of partial abelian extensions

Abstract

This paper is a new contribution to the partial Galois theory of groups. First, given a unital partial action αG of a finite group G on an algebra S such that S is an αG-partial Galois extension of SαG and a normal subgroup H of G, we prove that αG induces a unital partial action αG/H of G/H on the subalgebra of invariants SαH of S such that SαH is an αG/H-partial Galois extension of SαG. Second, assuming that G is abelian, we construct a commutative inverse semigroup Tpar(G,R), whose elements are equivalence classes of αG-partial abelian extensions of a commutative algebra R. We also prove that there exists a group isomorphism between Tpar(G,R)/ and T(G,A), where is a congruence on Tpar(G,R) and T(G,A) is the classical Harrison group of the G-isomorphism classes of the abelian extensions of a commutative ring A. It is shown that the study of Tpar(G,R) reduces to the case where G is cyclic. The set of idempotents of Tpar(G,R) is also investigated.