Realization of monoids with countable sum

Abstract

For every infinite cardinal number , -monoids and their realization have recently been introduced and studied by Nazemian and Smertnig. A -monoid H has a realization to a ring R if there exists an element x ∈ H such that H is 1 --braided over add(0 x), and add(0 x), as 0-monoid, has a realization to R. Furthermore, H has a realization to hereditary rings if there exists an element x ∈ H such that H is braided over add(x). These prompt an investigation into when 0-monoids have realizations. In this paper, we discuss the realization of 0-monoids and provide a complete characterization for the realization of two-generated ones in hereditary Von Neumann regular rings.

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