The Viterbo Transfer as a Map of Spectra
Abstract
Let L and N be two smooth manifolds of the same dimension. Let j L T*N be an exact Lagrange embedding. We denote the free loop space of X by X. C. Viterbo constructed a transfer map ( j)! H*( L) H*( N). This transfer was constructed using finite dimensional approximation of Floer homology. In this paper we define a family of finite dimensional approximations and realize this transfer as a map of Thom spectra: ( j)! ( N)-TN ( L)-TL+η, where η is a virtual vector bundle classified by the tangential information of j.
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