Entropy for Monge-Amp\`ere Measures in the Prescribed Singularities Setting

Abstract

In this note, we generalize the notion of entropy for potentials in a relative full Monge-Amp\`ere mass E(X, θ, φ), for a model potential φ. We then investigate stability properties of this condition with respect to blow-ups and perturbation of the cohomology class. We also prove a Moser-Trudinger type inequality with general weight and we show that functions with finite entropy lie in a relative energy class Enn-1(X, θ, φ) (provided n>1), while they have the same singularities of φ when n=1.

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