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16 results on '"Sung, Chiung-Jue Anna"'

1. Area and spectrum estimates for stable minimal surfaces

Author

Munteanu, Ovidiu, Sung, Chiung-Jue Anna, and Wang, Jiaping

Subjects
Mathematics - Differential Geometry, 53, 58
Abstract

This note concerns the area growth and bottom spectrum of complete stable minimal surfaces in a three-dimensional manifold with scalar curvature bounded from below. When the ambient manifold is the Euclidean space, by an elementary argument, it is shown directly from the stability inequality that the area of such minimal surfaces grows exactly as the Euclidean plane. Consequently, such minimal surfaces must be at, a well-known result due to Fisher-Colbrie and Schoen as well as do Carmo and Peng. In the case the ambient manifold is the hyperbolic space, explicit area growth estimate is also derived. For the bottom spectrum, upper bound estimates are established in terms of the scalar curvature lower bound of the ambient manifold.

Published
2022

2. Weighted Poincare inequality and the Poisson equation

Author

Munteanu, Ovidiu, Sung, Chiung-Jue Anna, and Wang, Jiaping

Subjects
Mathematics - Differential Geometry, Mathematics - Analysis of PDEs
Abstract

We develop Green's function estimate for manifolds satisfying a weighted Poincare inequality together with a compatible lower bound on the Ricci curvature. The estimate is then applied to establish existence and sharp estimates of the solution to the Poisson equation on such manifolds. As an application, a Liouville property for finite energy holomorphic functions is proven on a class of complete K\"ahler manifolds. Consequently, such K\"ahler manifolds must be connected at infinity., Comment: 40 pages, submitted

Published
2019

5. Poisson equation on complete manifolds

Author

Munteanu, Ovidiu, Sung, Chiung-Jue Anna, and Wang, Jiaping

Subjects
Mathematics - Differential Geometry, Mathematics - Analysis of PDEs
Abstract

We develop heat kernel and Green's function estimates for manifolds with positive bottom spectrum. The results are then used to establish existence and sharp estimates of the solution to the Poisson equation on such manifolds with Ricci curvature bounded below. As an application, we show that the curvature of a steady gradient Ricci soliton must decay exponentially if it decays faster than linear and the potential function is bounded above., Comment: 44 pages

Published
2017

13. Weighted Poincare inequality and the Poisson Equation.

Author

Munteanu, Ovidiu, Sung, Chiung-Jue Anna, and Wang, Jiaping

Subjects
*HOLOMORPHIC functions, *POISSON'S equation, *EQUATIONS, *ENERGY function
Abstract

We develop Green's function estimates for manifolds satisfying a weighted Poincaré inequality together with a compatible lower bound on the Ricci curvature. This estimate is then applied to establish existence and sharp estimates of solutions to the Poisson equation on such manifolds. As an application, a Liouville property for finite energy holomorphic functions is proven on a class of complete Kähler manifolds. Consequently, such Kähler manifolds must be connected at infinity. [ABSTRACT FROM AUTHOR]

Published
2021
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