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Non-Extendability of Bounded Continuous Functions
Published online by Cambridge University Press: 20 November 2018
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If X is a dense subspace of Y, much is known about the question of when every bounded continuous real-valued function on X extends to a continuous function on Y. Indeed, this is one of the central topics of [5]. In this paper we are interested in the opposite question: When are there continuous bounded real-valued functions on X which extend to no point of Y – X? (Of course, we cannot hope that every function on X fails to extend since the restrictions to X of continuous functions on Y extend to Y.) In this paper, we show that if Y is a compact metric space and if X is a dense subset of Y, then X admits a bounded continuous function which extends to no point of Y – X if and only if X is completely metrizable. We also show that for certain spaces Y and dense subsets X, the set of bounded functions on X which extend to a point of Y – X form a first category subset of C*(X).
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- Copyright © Canadian Mathematical Society 1980
References
1.
Bolstein, R., Sets of points of discontinuity,
Proc. Amer. Math. Soc.
38 (1973), 193–197.Google Scholar
3.
Erdos, P. and Shelah, S., Separability problems of almost disjoint families,
Israel J. Math.
12 (1972), 207–214.Google Scholar
4.
Fine, N., Gillman, L., and Lambeck, J., Rings of quotients of rings of functions (McGill University Press, 1965).Google Scholar
5.
Gillman, L. and Jerison, M., Rings of Continuous Functions (Van Nostrand, 1960).CrossRefGoogle Scholar
6.
Hechler, S., Classifying almost-disjoint families with applications to βN-N, Israel J. Math
10 (1971), 413–432.Google Scholar
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