Spectral Floer theory and tangential structures
Abstract
In PS, for a stably framed Liouville manifold X we defined a Donaldson-Fukaya category F(X;S) over the sphere spectrum, and developed an obstruction theory for lifting quasi-isomorphisms from F(X;Z) to F(X;S). Here, we define a spectral Donaldson-Fukaya category for any `graded tangential pair' of spaces living over BO BU, whose objects are Lagrangians L X for which the classifying maps of their tangent bundles lift to . The previous case corresponded to = = \pt\. We extend our obstruction theory to this setting. The flexibility to `tune' the choice of and increases the range of cases in which one can kill the obstructions, with applications to bordism classes of Lagrangian embeddings in the corresponding bordism theory (,),*. We include a self-contained discussion of when (exact) spectral Floer theory over a ring spectrum R should exist, which may be of independent interest.
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