The Cozero part of the pointfree version of Cc (X)

Abstract

Let Cc(L):= \α∈ R(L) Rα \, is a countable subset of \, R \, where Rα:=\r∈ R coz(α-r)≠\ for every α∈ R (L). By using idempotent elements, it is going to prove that Cozc[L]:= \coz(α) α∈Cc (L) \ is a σ-frame for every completely regular frame L, and from this, we conclude that it is regular, paracompact, perfectly normal and an Alexandroff algebra frame such that each cover of it is shrinkable. Also, we show that L is a zero-dimensional frame if and only if L is a c-completely regular frame.

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