English

Quantization in geometric pluripotential theory

Differential Geometry 2023-09-19 v1 Complex Variables

Abstract

The space of K\"ahler metrics can, on the one hand, be approximated by subspaces of algebraic metrics, while, on the other hand, can be enlarged to finite-energy spaces arising in pluripotential theory. The latter spaces are realized as metric completions of Finsler structures on the space of K\"ahler metrics. The former spaces are the finite-dimensional spaces of Fubini--Study metrics of K\"ahler quantization. The goal of this article is to draw a connection between the two. We show that the Finsler structures on the space of K\"ahler potentials can be quantized. More precisely, given a K\"ahler manifold polarized by an ample line bundle we endow the space of Hermitian metrics on powers of that line bundle with Finsler structures and show that the resulting path length metric spaces recover the corresponding metric completions of the Finsler structures on the space of K\"ahler potentials. This has a number of applications, among them a new approach to the rooftop envelopes and Pythagorean formulas of K\"ahler geometry, a new Lidskii type inequality on the space of K\"ahler metrics, and approximation of finite energy potentials, as well as geodesic segments by the corresponding smooth algebraic objects.

Keywords

Cite

@article{arxiv.1806.03800,
  title  = {Quantization in geometric pluripotential theory},
  author = {Tamás Darvas and Chinh H. Lu and Yanir A. Rubinstein},
  journal= {arXiv preprint arXiv:1806.03800},
  year   = {2023}
}
R2 v1 2026-06-23T02:25:22.306Z