Symmetry, Integrability and Geometry: Methods and Applications (SIGMA)

SIGMA 20 (2024), 039, 19 pages      arXiv:2310.10152      https://doi.org/10.3842/SIGMA.2024.039
Contribution to the Special Issue on Differential Geometry Inspired by Mathematical Physics in honor of Jean-Pierre Bourguignon for his 75th birthday

Entropy for Monge-Ampère Measures in the Prescribed Singularities Setting

Eleonora Di Nezza ^a, Stefano Trapani ^b and Antonio Trusiani ^c
a) IMJ-PRG, Sorbonne Université & DMA, École Normale Supérieure, Université PSL, CNRS, 4 place Jussieu & 45 Rue d'Ulm, 75005 Paris, France
^b) Università di Roma Tor Vergata, Via della Ricerca Scientifica 1, 00133 Roma, Italy
^c) Chalmers University of Technology, Chalmers tvärgata 3, 41296 Göteborg, Sweden

Received October 16, 2023, in final form May 04, 2024; Published online May 08, 2024

Abstract
In this note, we generalize the notion of entropy for potentials in a relative full Monge-Ampère mass $\mathcal{E}(X, \theta, \phi)$, for a model potential $\phi$. 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 $\mathcal{E}^{\frac{n}{n-1}}(X, \theta, \phi)$ (provided $n>1$), while they have the same singularities of $\phi$ when $n=1$.

Key words: Kähler manifolds; Monge-Ampère energy; entropy; big classes.

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