First steps going down on algebraic frames

Year 2019, , 1792 - 1807, 08.12.2019

Themba Dube

https://doi.org/10.15672/HJMS.2018.638

Abstract

We extend the ring-theoretic concept of going down  to algebraic frames and coherent maps. We then use the notion introduced to characterize algebraic frames of dimension 0 and frames of dimension at most 1. An application to rings yields a characterization of von Neumann regular rings that appears to have hitherto been overlooked. Namely, a commutative ring $A$ with identity is von Neumann regular if and only if $Ann(I)+P=A$, for every prime ideal $P$ of $A$ and any finitely generated ideal $I$ of $A$ contained in $P$.

Keywords

Algebraic frame, Sublocale, Prime element, Going-down, Commutative ring, Dimension

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