Berezin-Toeplitz operators, Kodaira maps, and random sections
Abstract
We study the zeros of sections of the form of a large power of a holomorphic positive Hermitian line bundle over a compact K\''ahler manifold , where is a random holomorphic section of and is a Berezin-Toeplitz operator, in the limit . In particular, we compute the second order approximation of the expectation of the distribution of these zeros. In a ball of radius of order around , assuming that the principal symbol of is real-valued and vanishes transversally, we show that this expectation exhibits two drastically different behaviors depending on whether or . These different regimes are related to a similar phenomenon about the convergence of the normalized Fubini-Study forms associated with : they converge to the K\''ahler form in the sense of currents as , but not as differential forms (even pointwise). This contrasts with the standard case , in which the convergence is in the -topology. From this, we are able to recover the zero set of from the zeros of .
Cite
@article{arxiv.2206.15112,
title = {Berezin-Toeplitz operators, Kodaira maps, and random sections},
author = {Michele Ancona and Yohann Le Floch},
journal= {arXiv preprint arXiv:2206.15112},
year = {2022}
}