English

Berezin-Toeplitz operators, Kodaira maps, and random sections

Complex Variables 2022-07-01 v1 Mathematical Physics math.MP Probability Symplectic Geometry

Abstract

We study the zeros of sections of the form TkskT_k s_k of a large power LkML^{\otimes k} \to M of a holomorphic positive Hermitian line bundle over a compact K\''ahler manifold MM, where sks_k is a random holomorphic section of LkL^{\otimes k} and TkT_k is a Berezin-Toeplitz operator, in the limit k+k \to +\infty. In particular, we compute the second order approximation of the expectation of the distribution of these zeros. In a ball of radius of order k12k^{-\frac{1}{2}} around xMx \in M, assuming that the principal symbol ff of TkT_k is real-valued and vanishes transversally, we show that this expectation exhibits two drastically different behaviors depending on whether f(x)=0f(x) = 0 or f(x)0f(x) \neq 0. These different regimes are related to a similar phenomenon about the convergence of the normalized Fubini-Study forms associated with TkT_k: they converge to the K\''ahler form in the sense of currents as k+k\rightarrow + \infty, but not as differential forms (even pointwise). This contrasts with the standard case f=1f=1, in which the convergence is in the C\mathscr{C}^{\infty}-topology. From this, we are able to recover the zero set of ff from the zeros of TkskT_k s_k.

Keywords

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}
}
R2 v1 2026-06-24T12:09:20.840Z