• Title of article

    Cone monotone mappings: Continuity and differentiability Original Research Article

  • Author/Authors

    Jakub Duda، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2008
  • Pages
    10
  • From page
    1963
  • To page
    1972
  • Abstract
    We generalize some results of Borwein, Burke, Lewis, and Wang to mappings with values in metric (resp. ordered normed linear) spaces, and we define two classes of monotone mappings between an ordered linear space and a metric space (resp. ordered linear space): KK-monotone dominated and cone-to-cone monotone mappings. KK-monotone dominated mappings naturally generalize mappings with finite variation (in the classical sense) and KK-monotone functions defined by Borwein, Burke and Lewis to mappings with domains and ranges of higher dimensions. First, using results of Veselý and Zajíček, we show some relationships between these classes. Then, we show that every KK-monotone function f:X→Rf:X→R, where XX is any Banach space, is continuous outside of a set which can be covered by countably many Lipschitz hypersurfaces. This sharpens a result due to Borwein and Wang. As a consequence, we obtain a similar result for KK-monotone dominated and cone-to-cone monotone mappings. Finally, we prove several results concerning almost everywhere differentiability (also in metric and w∗w∗-senses) of these mappings.
  • Keywords
    Monotonicity , Cones , Null sets , Gâteaux derivatives , Metric differential , a.e. differentiability
  • Journal title
    Nonlinear Analysis Theory, Methods & Applications
  • Serial Year
    2008
  • Journal title
    Nonlinear Analysis Theory, Methods & Applications
  • Record number

    860157