A universal discriminant formula for pencils of quadrics
Abstract
Let $V$ be a vector space of dimension $n+1$ over an algebraically closed field $\mathbb{k}$ of characteristic zero, and let $G_n = \operatorname{Gr}(2,\operatorname{Sym}^2V^\vee)$ be the Grassmannian parametrizing pencils of quadrics in $\mathbb{P}(V)\cong \mathbb{P}^n$.
The determinant of the universal pencil defines a universal binary form of degree $n+1$.
We prove that the divisor $\mathcal{D}_n\subseteq G_n$ of pencils whose determinant binary form has a multiple root has Chow class $[\mathcal{D}_n]=n(n+1)\sigma_1\in A^1(G_n),$ where $\sigma_1=c_1(S^\vee)$ and $S$ is the tautological rank-two subbundle on $G_n$.
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 $12\sigma_1$ for the boundary divisor in $\operatorname{Gr}(2,10)$ that the author established in a prior paper.
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