Abstract
Probability measures with either finite Monge-Ampere energy or finite entropy have played a central role in recent developments in Kahler geometry. In this note we make a systematic study of quasi-plurisubharmonic potentials whose Monge-Ampere measures have finite entropy. We show that these potentials belong to the finite energy class ${\mathcal E}^{\frac{n}{n-1}}$, where $n$ denotes the complex dimension, and provide examples showing that this critical exponent is sharp. Our proof relies on refined Moser-Trudinger inequalities for quasi-plurisubharmonic functions.
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