The commutative inverse semigroup of partial abelian extensions

TL;DR

This paper advances partial Galois theory by constructing a commutative inverse semigroup for partial abelian extensions and relating it to the classical Harrison group, providing new algebraic tools for abelian extensions.

Contribution

It introduces a new inverse semigroup of partial abelian extensions and establishes a connection with the Harrison group, extending the understanding of partial Galois theory.

Findings

Construction of the inverse semigroup $T_{par}(G,R)$ for partial abelian extensions.

Establishment of an isomorphism between $T_{par}(G,R)/\rho$ and the Harrison group.

Reduction of the study to the case where $G$ is cyclic.

Abstract

This paper is a new contribution to the partial Galois theory of groups. First, given a unital partial action $\alpha_G$ of a finite group $G$ on an algebra $S$ such that $S$ is an $\alpha_G$-partial Galois extension of $S^{\alpha_G}$ and a normal subgroup $H$ of $G$, we prove that $\alpha_G$ induces a unital partial action $\alpha_{G/H}$ of $G/H$ on the subalgebra of invariants $S^{\alpha_H}$ of $S$ such that $S^{\alpha_H}$ is an $\alpha_{G/H}$-partial Galois extension of $S^{\alpha_G}$. Second, assuming that $G$ is abelian, we construct a commutative inverse semigroup $T_{par}(G,R)$, whose elements are equivalence classes of $\alpha_G$-partial abelian extensions of a commutative algebra $R$. We also prove that there exists a group isomorphism between $T_{par}(G,R)/\rho$ and $T(G,A)$, where $\rho$ is a congruence on $T_{par}(G,R)$ 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 $T_{par}(G,R)$ reduces to the case where $G$ is cyclic. The set of idempotents of $T_{par}(G,R)$ is also investigated.