R-P-spaces and subrings of C(X)

For a zero-dimensional topological space X and a totally ordered field F with interval topology, Cc(X, F) denotes the ring consisting of ordered field-valued continuous functions with countable range on X. This article aims to study and investigate the rings of quotients of Cc(X,F). Qc(X,F) (resp. qc(X,F)), the maximal (resp. classical) ring of quotients of Cc(X,F) as a modified countable analogue of Q(X) (resp. q(X)), the maximal (resp. classical) ring of quotients of C(X) are characterized. It is proved that Qc(S), the maximal ring of quotients of the subring S of Cc(X,F), is a subring of Qc(X, F) if and only if every dense ideal in S has dense cozero-set in X. Also, the coincidence of rings of quotients of Cc(X, F) is investigated. We show that qc(X,F)=Cc(X, F) if and only if the set of non-units and zero-divisors in Cc(X,F) coincide if and only if X is almost CPF-space. Finally, it is shown that the fixed ring of quotients and the cofinite ring of quotients of Cc(X) coincide if and only if Hom(Mcp) = Cc(Xp) for every p ? X.

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On m-closure of ideals in a class of subrings of C(X)

Etebar,

Parsinia

2023

Filomat

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A subalgebra A(X) of C(X) is said to be a ?-subalgebra if it is closed under bounded inversion and the space of its maximal ideals equipped with the hull-kernel topology is homeomorphic to ?X with a homeomorphism which leaves X pointwise fixed. Kharbhih and Dutta in [Closure formula for ideals in intermediate rings, Appl. Gen. Topol. 21 (2) (2020), 195-200] showed that the closure of every ideal I of an intermediate ring with the m-topology, briefly, the m-closure of I, equals the intersection of all maximal ideals in A(X) containing I. In this paper, we extend this fact to the class of ?-subalgebras which is shown to be a larger class than intermediate rings. We also study a more extended class of subrings than ?-subalgebras, namely, LBI-subalgebras, and characterize the conditions under which an LBI-subalgebra is a ?-subalgebra. Moreover, some known facts in the context of C(X) and intermediate rings of C(X) are generalized to ?-subalgebras.

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R-P-spaces and subrings of C(X)

Cited by 3 publications

References 17 publications

Notes on a Class of Ideals in Intermediate Rings of Continuous Functions

Notes on a Class of Ideals in Intermediate Rings of Continuous Functions

Rings of quotients of the ring consisting of ordered field valued continuous functions with countable range

On m-closure of ideals in a class of subrings of C(X)

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