Christian Vilsmeier
Published 2019-12-12Version 1
Let $X$ be a proper algebraic variety over a non-archimedean, non-trivially valued field. We show that the non-archimedean Monge-Amp\`ere measure of a metric arising from a convex function on an open face of some skeleton of $X^{\text{an}}$ is equal to the real Monge-Amp\`ere measure of that function up to multiplication by a constant. As a consequence we obtain a regularity result for solutions of the non-archimedean Monge-Amp\`ere problem on curves.
On the comparison of different notions of geometric categories
A comparison of adic spaces and Berkovich spaces
A comparison between pretriangulated $\mbox{A}_{\infty}$-categories and $\infty$-Stable categories
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