Differentiability of non-archimedean volumes and non-archimedean Monge-Amp\`ere equations (with an appendix by Robert Lazarsfeld)

TL;DR

This paper proves the differentiability of non-archimedean volumes at semipositive metrics, linking derivatives to Monge-Ampère measures, and applies this to solve non-archimedean Monge-Ampère equations without algebraicity assumptions.

Contribution

It establishes the differentiability of non-archimedean volumes at continuous semipositive metrics and derives a new orthogonality property for non-archimedean plurisubharmonic functions.

Findings

Differentiability of non-archimedean volume at semipositive metrics.

Derivative expressed via Monge-Ampère measure integration.

Resolution of non-archimedean Monge-Ampère equations without algebraicity.

Abstract

Let $X$ be a normal projective variety over a complete discretely valued field and $L$ a line bundle on $X$. We denote by $X^\textrm{an}$ the analytification of $X$ in the sense of Berkovich and equip the analytification $L^\textrm{an}$ of $L$ with a continuous metric $\| \ \|$. We study non-archimedean volumes, a tool which allows us to control the asymptotic growth of small sections of big powers of $L$. We prove that the non-archimedean volume is differentiable at a continuous semipositive metric and that the derivative is given by integration with respect to a Monge-Amp\`ere measure. Such a differentiability formula had been proposed by M. Kontsevich and Y. Tschinkel. In residue characteristic zero, it implies an orthogonality property for non-archimedean plurisubharmonic functions which allows us to drop an algebraicity assumption in a theorem of S. Boucksom, C. Favre and M. Jonsson about the solution to the non-archimedean Monge-Amp\`{e}re equation. The appendix by R. Lazarsfeld establishes the holomorphic Morse inequalities in arbitrary characteristic.