Local multiplicities for an equivariantly enriched non-transverse B\'ezout's theorem
Abstract
We introduce the degree and local degree in equivariant motivic homotopy theory for the purpose of studying equivariant enumerative problems over general fields. Given a finite, tame group scheme G over a field k and an equivariant motivic ring spectrum EG, we define the equivariant motivic degree and a corresponding local degree of a relatively EG-oriented, proper, quasi-smooth morphism of G-schemes. We prove a local to global formula expressing the global degree as a sum of local contributions over G-orbits. Using these constructions, we define the Euler number of an oriented vector bundle on a quasi-smooth, proper derived stack and show that the Euler number is independent of the choice of section under appropriate hypotheses. In the presence of a finite group action, the equivariant Euler number can be computed as a sum of local equivariant degrees. As an application, we obtain an equivariantly enriched local multiplicity formula for an equivariant non-transverse B\'ezout theorem, expressing an equivariant intersection number as a sum of local equivariant degrees.
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