Monge-Amp\`ere measures for toric metrics on abelian varieties
Abstract
Toric metrics on a line bundle of an abelian variety A are the invariant metrics under the natural torus action coming from Raynaud's uniformization theory. We compute here the associated Monge-Amp\`ere measures for the restriction to any closed subvariety of A. This generalizes the computation of canonical measures done by the first author from canonical metrics to toric metrics and from discrete valuations to arbitrary non-archimedean fields.
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