Incidence strata of affine varieties with complex multiplicities

Abstract

To each affine variety X and m1,…,mk∈ C such that no subset of the mi add to zero, we construct a variety which for m1,…,mk ∈ N specializes to the closed (m1,…,mk)-incidence stratum of Symm1+…+mkX. These fit into a finite-type family, which is functorial in X, and which is topologically a family of C-weighted configuration spaces. We verify our construction agrees with an analogous construction in the Deligne category Rep(Sd) for d ∈ C. We next classify the singularity locus and branching behaviour of colored incidence strata for arbitrary smooth curves. As an application, we negatively answer a question of Farb and Wolfson concerning the existence of an isomorphism between two natural moduli spaces.