TOPOLOGICAL INVARIANTS OF STRATIFIED SPACES. (2 of 2)

          We demonstrate that every complex in SD(X) has naturally associated Lagrangian
          structures and conversely, that Lagrangian structures serve as the natural building
          blocks for objects in SD(X). Our main result asserts that there is in fact an
          equivalence of categories between SD(X) and a twisted product of categories of
          Lagrangian structures. This may be viewed as a Postnikov system for SD(X) whose
          fibers are categories of Lagrangian structures.

         We prove that the associated signature and L-classes are independent of the choice
         of Lagrangian structures, so that singular spaces with odd codimensional strata,
         such as e.g. certain compactifications of locally symmetric spaces, have well-defined
         L-classes, provided Lagrangian structures exist.

                                                                                           Back.

Last modified: 2018. © 2006 Markus Banagl. All Rights Reserved. Site Map. Datenschutzerklärung.