TY - JOUR
T1 - A Codazzi-like equation and the singular set for C1 smooth surfaces in the Heisenberg group.
JF - Journal fur die Reine und Angewandte Mathematik, Issue 671, October 2012, Pages 131-198
Y1 - 2012
A1 - Andrea Malchiodi
A1 - Paul Yang
A1 - Jih-Hsin Cheng
A1 - JennFang Hwang
AB - In this paper, we study the structure of the singular set for a C 1 smooth surface in the 3-dimensional Heisenberg group ℍ 1. We discover a Codazzi-like equation for the p-area element along the characteristic curves on the surface. Information obtained from this ordinary differential equation helps us to analyze the local configuration of the singular set and the characteristic curves. In particular, we can estimate the size and obtain the regularity of the singular set. We understand the global structure of the singular set through a Hopf-type index theorem. We also justify the Codazzi-like equation by proving a fundamental theorem for local surfaces in ℍ 1
PB - SISSA
UR - http://hdl.handle.net/1963/6556
U1 - 6490
U2 - Mathematics
U4 - 1
U5 - MAT/05 ANALISI MATEMATICA
ER -
TY - JOUR
T1 - Axial symmetry of some steady state solutions to nonlinear Schrödinger equations
JF - Proc. Amer. Math. Soc. 139 (2011), 1023-1032
Y1 - 2011
A1 - Changfeng Gui
A1 - Andrea Malchiodi
A1 - Haoyuan Xu
A1 - Paul Yang
KW - Nonlinear Schrödinger equation
AB - In this note, we show the axial symmetry of steady state solutions of nonlinear Schrodinger equations when the exponent of the nonlinearity is between the critical Sobolev exponent of n dimensional space and n - 1 dimensional space.
PB - American Mathematical Society
UR - http://hdl.handle.net/1963/4100
U1 - 304
U2 - Mathematics
U3 - Functional Analysis and Applications
ER -
TY - JOUR
T1 - Minimal surfaces in pseudohermitian geometry
JF - Annali della Scuola Normale Superiore di Pisa, Classe di Scienze (5), 4 (2005) 129-177.
Y1 - 2005
A1 - Jih-Hsin Cheng
A1 - JennFang Hwang
A1 - Andrea Malchiodi
A1 - Paul Yang
AB - We consider surfaces immersed in three-dimensional pseudohermitian manifolds. We define the notion of (p-)mean curvature and of the associated (p-)minimal surfaces, extending some concepts previously given for the (flat) Heisenberg group. We interpret the p-mean curvature not only as the tangential sublaplacian of a defining function, but also as the curvature of a characteristic curve, and as a quantity in terms of calibration geometry. As a differential equation, the p-minimal surface equation is degenerate (hyperbolic and elliptic). To analyze the singular set, we formulate some {\em extension} theorems, which describe how the characteristic curves meet the singular set. This allows us to classify the entire solutions to this equation and to solve a Bernstein-type problem (for graphs over the $xy$-plane) in the Heisenberg group $H_1$. In $H_{1}$, identified with the Euclidean space $R^{3}$, the p-minimal surfaces are classical ruled surfaces with the rulings generated by Legendrian lines. We also prove a uniqueness theorem for the Dirichlet problem under a condition on the size of the singular set in two dimensions, and generalize to higher dimensions without any size control condition. We also show that there are no closed, connected, $C^{2}$ smoothly immersed constant p-mean curvature or p-minimal surfaces of genus greater than one in the standard $S^{3}.$ This fact continues to hold when $S^{3}$ is replaced by a general spherical pseudohermitian 3-manifold.
PB - Scuola Normale Superiore
UR - http://hdl.handle.net/1963/4579
U1 - 4347
U2 - Mathematics
U3 - Functional Analysis and Applications
U4 - -1
ER -