On the Integral Cohomology of Fano Varieties of Linear Subspaces

Abstract

For each n, each dimension r, and each subscheme X ⊂ Pn defined as the common zero-locus of s hypersurfaces, of degrees d = (d1, … , ds) say, the Fano variety Fr(X) of projective r-spaces contained in X is a subvariety of the Grassmannian G(r + 1, n + 1). We prove that the inclusion Fr(X) ⊂ G(r + 1, n + 1) induces an isomorphism Hi(G(r + 1, n + 1); Z) → Hi(Fr(X); Z) on integral cohomology for certain indices i (i.e., depending only on n, r, s and d). Our result extends to the integral setting a result proved for rational cohomology by Debarre and Manivel (Math. Ann. '98), and answers a question of Benoist and Voisin. Our techniques adapt ones introduced by Tu (Trans. Am. Math. Soc. '89) for a different purpose.

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