A universal discriminant formula for pencils of quadrics
Abstract
Let V be a vector space of dimension n+1 over an algebraically closed field k of characteristic zero, and let Gn = Gr(2,Sym2V) be the Grassmannian parametrizing pencils of quadrics in P(V) Pn. The determinant of the universal pencil defines a universal binary form of degree n+1. We prove that the divisor Dn⊂eq Gn of pencils whose determinant binary form has a multiple root has Chow class [Dn]=n(n+1)σ1∈ A1(Gn), where σ1=c1(S) and S is the tautological rank-two subbundle on Gn. More generally, the higher-contact loci of determinant binary forms are computed by a universal jet formula. We also formulate the determinant-root collision strata as refined pullbacks of the universal collision strata for binary forms. For n=3, the main formula recovers the class 12σ1 for the boundary divisor in Gr(2,10) that the author established in a prior paper.
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