The Set-Self-Tietze Property

Abstract

We introduce the set-self-Tietze property, an analogue of the self-Tietze property for upper semi-continuous set-valued functions. A topological space X is self-Tietze, if for every closed A ⊂eq X and continuous function f A X, there is a continuous extension F X X of f. A topological space X is set-self-Tietze, if for every closed A ⊂eq X and upper semi-continuous set-valued function f A 2X, there exists an upper semi-continuous set-valued function F X 2X such that . F |A = f. We show every compact metric space is set-self-Tietze, and that the torus is not self-Tietze.

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