• Title of article

    On the coincidence of the upper Kuratowski topology with the cocompact topology

  • Author/Authors

    Alleche، نويسنده , , Boualem and Calbrix، نويسنده , , Jean، نويسنده ,

  • Issue Information
    دوماهنامه با شماره پیاپی سال 1999
  • Pages
    12
  • From page
    207
  • To page
    218
  • Abstract
    A topological space X is said to be consonant if the upper Kuratowski topology and the cocompact topology defined on the set of all closed subsets of X coincide (otherwise, the space X is said to be dissonant). One of the purposes of this paper is to study the notion of consonance, and to solve some open questions which arise from different works about this notion. We give a criterion of consonance which is based on the property of sequentiality, and which extends a result of C. Costantini and P. Vitolo. We prove that Hausdorff locally kω-spaces are consonant, answering a question of T. Nogura and D. Shakhmatov negatively. With the help of the concept of Radon measure, we establish a criterion of dissonance. In particular, we give a dissonant hereditarily Baire separable metrizable space, answering a question of T. Nogura and D. Shakhmatov positively, and we prove that the Sorgenfrey real line is a dissonant space, giving a negative answer to a question of S. Dolecki, G. Greco and A. Lechicki. o study the notion of hyperconsonance, that is, the coincidence of the convergence topology with the Fell topology, and we give a positive answer to a question of M. Arab and the second author of this paper. that all our results concerning the criterion based on Radon measures are the subject of an unpublished paper of June 1995.
  • Keywords
    k?-space , ?-additive measure , Hereditarily Baire space , Radon measure , Ultrafilter‎ , Hyperspace , Cocompact topology , Upper Kuratowski topology , Kuratowski topology , Sequential space , Fell topology
  • Journal title
    Topology and its Applications
  • Serial Year
    1999
  • Journal title
    Topology and its Applications
  • Record number

    1579402