Normal invariant of nearby Lagrangians via twisted derivative
Abstract
Let L and M be closed, connected, smooth manifolds and let L T*M be an exact Lagrangian embedding. The induced map L M is known by earlier work to be a homotopy equivalence. We show that the associated normal invariant M G/O factors through a map B(T,Q) G/O which is a twisted version of the Waldhausen derivative T G on the space T of tubes. Further, we show that this twisted derivative map itself factors though a map B(G/O) G/O which is a twisted version of the S-duality map BG G. In particular we deduce that the normal invariant of the homotopy equivalence L M is 2-torsion.
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