Relative de Rham Theory on Nash Manifolds
Abstract
For a Nash submersion φ X Y, we study the complex SDR(φ) of Schwartz sections of the relative de Rham complex of φ. We define the notion of Schwartz sections of constructible sheaves on Nash manifolds and prove that SDR(φ) is homotopy equivalent to the Schwartz sections of the proper push-forward φ!RX of the constant sheaf RX. Using this equivalence, we show that SDR(φ) depends (up to homotopy equivalence) only on the homology type of the map φ. We also deduce that SDR(φ) has Hausdorff homology spaces.
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