Categories and General Algebraic Structures with Applications (Jul 2022)
On some properties of the space of minimal prime ideals of πΆπ (π)
Abstract
In this article we consider some relations between the topological properties of the spaces X and Min(Cc (X)) with algebraic properties of Cc (X). We observe that the compactness of Min(Cc (X)) is equivalent to the von-Neumann regularity of qc (X), the classical ring of quotients of Cc (X). Furthermore, we show that if π is a strongly zero-dimensional space, then each contraction of a minimal prime ideal of πΆ(π) is a minimal prime ideal of Cc(X) and in this case πππ(πΆ(π)) and Min(Cc (X)) are homeomorphic spaces. We also observe that if π is an Fc-space, then Min(Cc (X)) is compact if and only if π is countably basically disconnected if and only if Min(Cc(X)) is homeomorphic with Ξ²0X. Finally, by introducing zoc-ideals, countably cozero complemented spaces, we obtain some conditions on X for which Min(Cc (X)) becomes compact, basically disconnected and extremally disconnected.
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