Two Moore manifolds

AbstractReed and Zenor have shown that locally connected, locally compact, normal Moore spaces are metrizable. The first of the two examples presented is a locally connected, locally compact, pseudonormal nonmetrizable Moore space. The second is a locally connected, locally compact, pseudocompact nonmetrizable Moore space and can be constructed assuming the Continuum Hypothesis. Therefore normality in the Reed-Zenor theorem cannot be replaced by pseudonormality or (consistently) pseudocompactness.Both spaces can be modified in such a way that they are manifolds