On regular operators extending (pseudo)metrics

Abstract

It is proved that for every stratifiable space Y and a closed subset X⊂ Y there exists a regular (i.e. linear positive with unit norm) extension operator T:C(X× X) C(Y× Y) preserving the class of (pseudo)metrics. This operator is continuous with respect to the pointwise as well as to the compact-open topologies on the linear lattices of continuous functions C(X X) and C(Y Y). If moreover the space Y is metrizable then the operator T preserves the class of admissible metrics. The equivariant analog of the above statement is proved as well.

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