Expected Euler characteristic of excursion sets of random holomorphic sections on complex manifolds
Abstract
We prove a formula for the expected euler characteristic of excursion sets of random sections of powers of an ample bundle (L,h), where h is a Hermitian metric, over a K\"ahler manifold (M,ω). We then prove that the critical radius of the Kodaira embedding N:M→ n given by an orthonormal basis of H0(M,LN) is bounded below when N→ ∞. This result also gives conditions about when the preceding formula is valid.
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