Constructs a symmetric monoidal ∞-category of sheaves whose unit is geometric cobordism and canonically identifies its endomorphisms with the E∞-Thom spectrum.
Bulk-deformations, Floer complex bordism, and Grothendieck-Riemann-Roch
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abstract
Given a Liouville manifold, we compute a Floer-homotopical invariant -- the complexification of the lift of symplectic cohomology to complex cobordism -- in terms of a classical Floer-theoretic invariant, namely, symplectic cohomology bulk-deformed by the Chern character. We do this by giving an explicit model for the complexified homotopy groups of the MU-module spectrum associated to a complex-oriented flow category and proving a ``homotopy coherent'' version of the classical Grothedieck-Riemann-Roch theorem. Using the aforementioned relation, we establish a computable cohomological criterion, in terms of the pair-of-pants product and the BV operator on symplectic cohomology, for when this MU lift cannot be obtained via base change from the sphere spectrum; moreover, we give examples where this holds. Finally, we use this non-base change criterion to detect examples of non-trivial higher-dimensional complex cobordism classes of relative Gromov-Witten type moduli spaces in the context of a smooth complex projective variety relative to an ample smooth divisor.
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math.AT 1years
2026 1verdicts
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A homotopy coherent Pontryagin-Thom isomorphism
Constructs a symmetric monoidal ∞-category of sheaves whose unit is geometric cobordism and canonically identifies its endomorphisms with the E∞-Thom spectrum.