Sam Bachhuber, Aaron Benda, Benjamin Christophel, Tamás Darvas
Published 2023-04-13Version 1
In previous work, Darvas-George-Smith obtained inequalities between the large scale asymptotic of the $J$ functional with respect to the $d_1$ metric on the space of toric K\"ahler metrics/rays. In this work we prove sharpness of these inequalities on all toric K\"ahler manifolds, and study the extremizing potentials/rays. On general K\"ahler manifolds we show that existence of radial extremizers is equivalent with the existence of plurisupported currents, as introduced and studied by McCleerey.
Comments: Results from an REU project. arXiv admin note: text overlap with arXiv:2101.02589
Journal: Analysis Math. 48 (2022), no. 2, 307-330
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