Tian's theorem for Grassmannian embeddings and degeneracy sets of random sections

Abstract

Let (X,ω) be a compact K\"ahler manifold, (L,hL) be a positive line bundle, and (E,hE) be a Hermitian holomorphic vector bundle of rank r on X. We prove that the pullback by the Kodaira embedding associated to Lp E of the k-th Chern class of the dual of the universal bundle over the Grassmannian converges as p∞ to the k-th power of the Chern form c1(L,hL), for 0≤ k≤ r. If c1(L,hL)=ω we also determine the second term in the semiclassical expansion, which involves c1(E,hE). As a consequence we show that the limit distribution of zeros of random sequences of holomorphic sections of high powers Lp E is c1(L,hL)r. Furthermore, we compute the expectation of the currents of integration along degeneracy sets of random holomorphic sections.

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