Let X be the base locus of a linear system W of k quadrics. Let also S be the intersection of W with the discriminant hypersurface in the space of all homogeneous polynomials of degree two. We prove a formula relating the topology of X with the one of S and its (iterated) singular points. As a corollary we prove the sharp bound b(X)\leq O(n)^{k-1}.
The Higher Connectivity of Intersections of Real Quadrics
Sequential Parametrized Motion Planning and its Complexity
The total Betti number of the intersection of three real quadrics
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