K\"ahler-Einstein metrics on families of Fano varieties
Chung-Ming Pan, Antonio Trusiani
TL;DR
This paper develops an analytic framework to study the stability and variation of K"ahler-Einstein metrics across families of Fano varieties, providing uniform estimates and convergence results.
Contribution
It introduces a new notion of convergence for quasi-plurisubharmonic functions and establishes uniform a priori estimates and continuity of K"ahler-Einstein metrics in families.
Findings
Uniform a priori estimates on K"ahler-Einstein potentials
Continuous variation of K"ahler-Einstein currents
Uniform Moser-Trudinger inequalities and Ding functional coercivity
Abstract
Given a one-parameter family of -Fano varieties such that the central fibre admits a unique K\"ahler-Einstein metric, we provide an analytic method to show that the neighboring fibre admits a unique K\"ahler-Einstein metric. Our results go beyond by establishing uniform a priori estimates on the K\"ahler-Einstein potentials along fully degenerate families of -Fano varieties. In addition, we show the continuous variation of these K\"ahler-Einstein currents, and establish uniform Moser-Trudinger inequalities and uniform coercivity of the Ding functionals. Central to our article is introducing and studying a notion of convergence for quasi-plurisubharmonic functions within families of normal K\"ahler varieties. We show that the Monge-Amp\`ere energy is upper semi-continuous with respect to this topology, and we establish a Demailly-Koll\'ar result for functions with…
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Taxonomy
TopicsGeometry and complex manifolds · Geometric Analysis and Curvature Flows