Some ring-theoretic properties of the ring of RLτ

Abstract

The aim of this article is to survey ring-theoretic properties of Kasch, the regularity and the injectivity of the ring of real-continuous functions on a topoframe L τ, i.e., RLτ. In order to study these properties, the concept of P-spaces and extremally disconnected spaces are extend to topoframes. For a P- topoframe L τ, the ring RLτ is 0-Kasch ring. P- topoframes are characterized in terms of ring-theoretic properties of the regularity and injectivity of the ring of real-continuous functions on a topoframe. It follows from these characterizations that the ring RLτ is regular if and only if it is 0-selfinjective. For a completely regular topoframe Lτ, we show that RLτ is a Bear ring if and only if it is a CS-ring if and only if Lτ is extremally disconnected and also prove that it is selfinjective ring if and only if L τ is an extremally disconnected P-topoframe.