Expected local topology of random complex submanifolds

Abstract

Let n≥ 2 and r∈ \1, ·s, n-1\ be integers, M be a compact smooth K\''ahler manifold of complex dimension n, E be a holomorphic vector bundle with complex rank r and equipped with an hermitian metric hE, and L be an ample holomorphic line bundle over M equipped with a metric h with positive curvature form. For any d∈ N large enough, we endorse the space of holomorphic sections H0(M,E Ld) with the natural Gaussian measure associated to hE , h and its curvature form. Let U⊂ M be an open subset with smooth boundary. We prove that the average of the (n-r)-th Betti number of the vanishing locus in U of a random section s of H0(M,E Ld) is asymptotic to n-1 r-1 dn∫U c1(L)n for large d. On the other hand, the average of the other Betti numbers are o(dn). The first asymptotic recovers the classical deterministic global algebraic computation. Moreover, such a discrepancy in the order of growth of these averages is new and constrasts with all known other smooth Gaussian models, in particular the real algebraic one. We prove a similar result for the affine complex Bargmann-Fock model.