$p$-Laplace Equations, $p$-Superharmonic Functions, and Applications in Conformal Geometry

Shiguang Ma; Jie Qing

doi:10.4208/jms.v58n4.25.05

$p$-Laplace Equations, $p$-Superharmonic Functions, and Applications in Conformal Geometry

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In this paper, we give an exposition of our recent work on nonlinear potential theory in conformal geometry. We apply nonlinear potential theory to study $p$-Laplace equations arising from conformal geometry and, in particular, the problems related to the asymptotic behavior near and the size of singularities in conformal geometry.

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$p$-Laplace equations $p$-superharmonic functions Wolff potentials $p$-capacities $p$-thin sets for singular behavior intermediate Schouten curvature tensor Hausdorff dimensions

Author Biographies

Shiguang Ma

School of Mathematical Sciences, Nankai University, Tianjin 300071, China
Jie Qing

Department of Mathematics, University of California Santa Cruz, California 95064, USA

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10.4208/jms.v58n4.25.05

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$p$-Laplace Equations, $p$-Superharmonic Functions, and Applications in Conformal Geometry. (2025). Journal of Mathematical Study, 58(4), 479-490. https://doi.org/10.4208/jms.v58n4.25.05

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$p$-Laplace Equations, $p$-Superharmonic Functions, and Applications in Conformal Geometry

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