The d*-space

Abstract

In this paper, we introduce the concept of d-spaces. We find that strong d-spaces are d-spaces, but the converse does not hold. We give a characterization for a topological space to be a d-space. We prove that the retract of a d-space is a d-space. We obtain the result that for any T0 space X and Y, if the function space TOP(X,Y) endowed with the Isbell topology is a d-space, then Y is a d-space. We also show that for any T0 space X, if the Smyth power space Qv(X) is a d-space, then X is a d-space. Meanwhile, we give a counterexample to illustrate that conversely, for a d-space X, the Smyth power space Qv(X) may not be a d-space.

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