Abstract
This article continues our first paper on this topic. In this article we first continue our review of the technique of iterated forcing and reflection by describing the machinery developed for reflection from a weakly compact cardinal. Next we present more applications of the technique to show conditions under which nonmetrizability, nonparacompactness, or nondevelopability reflect. In the final section we present yet another proof of the normal Moore space conjecture which avoids elementary embeddings by using filter combinatorics and provides a quick path to the solution for those less interested in generally applicable techniques.
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