Algebraic Spivak's theorem and applications
Abstract
We prove an analogue of Lowrey--Sch\"urg's algebraic Spivak's theorem when working over a base ring A that is either a field or a nice enough discrete valuation ring, and after inverting the residual characteristic exponent e in the coefficients. By this result algebraic bordism groups of quasi-projective derived A-schemes can be generated by classical cycles, leading to vanishing results for low degree e-inverted bordism classes, as well as to the classification of quasi-smooth projective A-schemes of low virtual dimension up to e-inverted cobordism. As another application, we prove that e-inverted bordism classes can be extended from an open subset, leading to the proof of homotopy invariance of e-inverted bordism groups for quasi-projective derived A-schemes.
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