• Title of article

    Intersection theory for o-minimal manifolds Original Research Article

  • Author/Authors

    Alessandro Berarducci، نويسنده , , Margarita Otero، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2001
  • Pages
    33
  • From page
    87
  • To page
    119
  • Abstract
    We develop an intersection theory for definable Cp-manifolds in an o-minimal expansion of a real closed field and we prove the invariance of the intersection numbers under definable Cp-homotopies (p>2). In particular we define the intersection number of two definable submanifolds of complementary dimensions, the Brouwer degree and the winding numbers. We illustrate the theory by deriving in the o-minimal context the Brouwer fixed point theorem, the Jordan-Brouwer separation theorem and the invariance of the Lefschetz numbers under definable Cp-homotopies. A. Pillay has shown that any definable group admits an abstract manifold structure. We apply the intersection theory to definable groups after proving an embedding theorem for abstract definably compact Cp-manifolds. In particular using the Lefschetz fixed point theorem we show that the Lefschetz number of the identity map on a definably compact group, which in the classical case coincides with the Euler characteristic, is zero.
  • Keywords
    o-minimality
  • Journal title
    Annals of Pure and Applied Logic
  • Serial Year
    2001
  • Journal title
    Annals of Pure and Applied Logic
  • Record number

    889753