Local geodesics for plurisubharmonic functions
Complex Variables
2016-05-19 v3
Abstract
We study geodesics for plurisubharmonic functions from the Cegrell class on a bounded hyperconvex domain of and show that, as in the case of metrics on K\"{a}hler compact menifolds, they linearize an energy functional. As a consequence, we get a uniqueness theorem for functions from in terms of total masses of certain mixed Monge-Amp\`ere currents. Geodesics of relative extremal functions are considered and a reverse Brunn-Minkowski inequality is proved for capacities of multiplicative combinations of multi-circled compact sets. We also show that functions with strong singularities generally cannot be connected by (sub)geodesic arks.
Cite
@article{arxiv.1604.04504,
title = {Local geodesics for plurisubharmonic functions},
author = {Alexander Rashkovskii},
journal= {arXiv preprint arXiv:1604.04504},
year = {2016}
}
Comments
12 pages. Proof of convergence in capacity at endpoints added. Some minor changes