Coherence of Smyth powerspaces
Abstract
In this paper, we study when the Smyth powerspace Q*v(X) of a topological space X is coherent, and prove that X is coherent and weakly Hausdorff if and only if Q*v(X) is coherent and weakly Hausdorff. We give examples to show that neither coherence nor weak Hausdorffness of X solely implies that Q*v(X) is coherent or weakly Hausdorff. As a byproduct, our work gives an affirmative answer to a question raised by Xu.
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