Fractional skew monoid rings
Abstract
Given an action of a monoid on a ring by ring endomorphisms, and an Ore subset of , a general construction of a fractional skew monoid ring is given, extending the usual constructions of skew group rings and of skew semigroup rings. In case is a subsemigroup of a group such that , we obtain a -graded ring with the property that, for each , the -component contains a left invertible element and the -component contains a right invertible element. In the most basic case, where is the additive group of integers and is the submonoid of nonnegative integers, the construction is fully determined by a single ring endomorphism of . If is an isomorphism onto a proper corner , we obtain an analogue of the usual skew Laurent polynomial ring, denoted by . Examples of this construction are given, and it is proven that several classes of known algebras, including the Leavitt algebras of type , can be presented in the form . Finally, mild and reasonably natural conditions are obtained under which is a purely infinite simple ring.
Cite
@article{arxiv.math/0307320,
title = {Fractional skew monoid rings},
author = {P. Ara and M. A. Gonzalez-Barroso and K. R. Goodearl and E. Pardo},
journal= {arXiv preprint arXiv:math/0307320},
year = {2007}
}