The implications between different classes of topological spaces considered in this paper are summarized in the following diagram: cC Ace ~
AcPC cPCHere P = Para, C = Compact, c = Countably, A = Almost. The class of almost-gR-compact spaces has been introduced and studied by Singal and Singal [24].The authors are grateful to the referee for his valuable suggestions for the improvement of the paper.
Abstract. The main purpose of this paper is to prove the following two theorems, an order hereditary closure preserving sum theorem and an hereditary theorem:(1) If a topological property P satisfies ( ′ ) and is closed hereditary, and if V is an order hereditary closure preserving open cover of X and each V ∈ V is elementary and possesses P, then X possesses P.(2) Let a topological property P satisfy ( ′ ) and (β), and be closed hereditary. Let X be a topological space which possesses P. If every open subset G of X can be written as an order hereditary closure preserving (in G) collection of elementary sets, then every subset of X possesses P.
AMS Classification: 54D20
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