Continuous selections for proximal continuous paraconvex-valued mappings (Q2448749)

Let \(X\) be a topological space, \(Y\) a Banach space and \(F:X\to Y\) a multifunction which is both lsc and metrically usc, taking nonempty, closed \(\alpha\)-paraconvex values. It is proved that \(F\) has a continuous selection. This resolves affirmatively a question posed by V. Gutev. A similar question, when the metrical usc of \(F\) is assumed with respect to a metric compatible with the topology of \(Y\), but not induced by norm, remains still open. Some corollaries concerning multiresolutions for multifunctions with values in completely metrizable spaces are also included.