On linear operators extending [pseudo]metrics
Abstract
For every closed subset X of a stratifiable [resp. metrizable] space Y we construct a positive linear extension operator T:RX× X RY× Y preserving constant functions, bounded functions, continuous functions, pseudometrics, metrics, [resp. dominating metrics, and admissible metrics]. This operator is continuous with respect to each of the three topologies: point-wise convergence, uniform, and compact-open. An equivariant analog of the above statement is proved as well.
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