A Non-Hausdorff Multifunction Ascoli Theorem for k3-Spaces
Canadian journal of mathematics, Tome 27 (1975) no. 4, pp. 893-900

Voir la notice de l'article provenant de la source Cambridge University Press

A non-Hausdorff Ascoli theorem for continuous functions was established in [6]. The present purpose is to extend this result to point-compact continuous multifunction, using Levine's generalization for closed subsets [12]. The paper is organized as follows: the object of section 2 is to establish the necessary multifunction lemmas and to introduce the notion of a Tychonoff set; section 3 generalizes to multifunction context the partial exponential law of R. H. Fox [9, p. 430], and establishes a special exponential law for multifunctions; section 4 concerns the crucial properties of even continuity for multifunctions, introduced in [8]; the main theorem of the paper is established in section 5.
Morales, Pedro. A Non-Hausdorff Multifunction Ascoli Theorem for k3-Spaces. Canadian journal of mathematics, Tome 27 (1975) no. 4, pp. 893-900. doi: 10.4153/CJM-1975-096-8
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