Compactifications of spaces of symmetric matrices and pointed Kontsevich spaces of isotropic Grassmannians
Abstract
We study two closely related families of varieties arising from genus 0 stable maps to the Lagrangian Grassmannian LG(n,2n). First, we construct the Kausz--type compactification TLn of the space of symmetric matrices and give an explicit description of its birational geometry. Second, we realize TLn as a general evaluation fiber in a Kontsevich space, and then exploit this modular interpretation to derive consequences for the birational geometry of the space of pointed conics M0,1(LG(n,2n),2). Analogous compactifications related to orthogonal Grassmannians are also presented.
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