@article{Dow_Porter_Stephenson_Grant Woods_2004, title={Spaces whose Pseudocompact Subspaces are Closed Subsets}, volume={5}, url={https://polipapers.upv.es/index.php/AGT/article/view/1973}, DOI={10.4995/agt.2004.1973}, abstractNote={<p>Every first countable pseudocompact Tychonoff space X has the property that every pseudocompact subspace of X is a closed subset of X (denoted herein by “FCC”). We study the property FCC and several closely related ones, and focus on the behavior of extension and other spaces which have one or more of these properties. Characterization, embedding and product theorems are obtained, and some examples are given which provide results such as the following. There exists a separable Moore space which has no regular, FCC extension space. There exists a compact Hausdorff Fréchet space which is not FCC. There exists a compact Hausdorff Fréchet space X such that X, but not X<sup>2</sup>, is FCC.</p>}, number={2}, journal={Applied General Topology}, author={Dow, Alan and Porter, Jack R. and Stephenson, R.M. and Grant Woods, R.}, year={2004}, month={Oct.}, pages={243–264} }