Poincar\'e type J-equation
Abstract
We introduce a two-parameter continuity path for the J-equation and use it to characterize the solvability of the J-equation for K\"ahler metrics with Poincar\'e type singularities along a divisor , allowing simple normal crossings and self-intersections. On K\"ahler surfaces, we show that the classical subsolution condition in the smooth setting implies solvability in the Poincar\'e type setting for any smooth divisor . As a consequence, if contains no curves of negative self-intersections and is ample, then the K-energy is bounded from below on any Poincar\'e type K\"ahler class. In the smooth divisor case, we further analyze the asymptotic behavior of solutions near , and show that existence of a Poincar\'e type solution implies existence of a solution to the J-equation on .
Cite
@article{arxiv.2605.01179,
title = {Poincar\'e type J-equation},
author = {Xiuxiong Chen and Yulun Xu},
journal= {arXiv preprint arXiv:2605.01179},
year = {2026}
}
Comments
40 pages