Tate-valued Characteristic Classes
Abstract
We define a projective variant of classical complex orientation theory. Using this, we construct a map of spectra which lifts the total Chern class, providing an alternative answer to an old question of Segal segal, previously answered by Lawson et al lawsonetal. We also lift and generalize the ``sharp'' construction of Ando-French-Ganter afg to an operation on arbitrary ∞-complex orientations, thereby providing a rich source of new ∞-orientations for commutative ring spectra. In particular we give an ∞-lift of the Jacobi orientation, a generalization of the much-studied two variable elliptic genus. Finally, we construct some new complex orientations of periodic ring spectra as requested in hahnyuan.
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