On Pli\'s metric on the space of strictly convex compacta
Abstract
We consider a certain metric on the space of all convex compacta in n, introduced by A. Pli\'s. The set of strictly convex compacta is a complete metric subspace of the metric space of convex compacta with respect to this metric. We present some applications of this metric to the problems of set-valued analysis, in particular we estimate the distance between two compact sets with respect to this metric and to the Hausdorff metric.
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