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Order isomorphisms on function spaces

Tom 219 / 2013

Denny H. Leung, Lei Li Studia Mathematica 219 (2013), 123-138 MSC: Primary 46E50; Secondary 46E15, 47B65. DOI: 10.4064/sm219-2-3

Streszczenie

The classical theorems of Banach and Stone (1932, 1937), Gelfand and Kolmogorov (1939) and Kaplansky (1947) show that a compact Hausdorff space $X$ is uniquely determined by the linear isometric structure, the algebraic structure, and the lattice structure, respectively, of the space $C(X)$. In this paper, it is shown that for rather general subspaces $A(X)$ and $A(Y)$ of $C(X)$ and $C(Y)$, respectively, any linear bijection $T: A(X) \to A(Y)$ such that $f \geq 0$ if and only if $Tf \geq 0$ gives rise to a homeomorphism $h: X \to Y$ with which $T$ can be represented as a weighted composition operator. The three classical results mentioned above can be derived as corollaries. Generalizations to noncompact spaces and other function spaces such as spaces of Lipschitz functions and differentiable functions are presented.

Autorzy

  • Denny H. LeungDepartment of Mathematics
    National University of Singapore
    Singapore 119076
    e-mail
  • Lei LiSchool of Mathematical Sciences and LPMC
    Nankai University
    Tianjin, 300071, China
    e-mail

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