Your search keyword '"Pak Tung Ho"' showing total 4 results

1. Chern-Yamabe problem and Chern-Yamabe soliton

Author

Pak Tung Ho and Jinwoo Shin

Subjects

General Mathematics, 010102 general mathematics, Yamabe problem, Conformal map, Complex dimension, 01 natural sciences, Mathematics::K-Theory and Homology, 0103 physical sciences, Metric (mathematics), Hermitian manifold, Mathematics::Differential Geometry, 010307 mathematical physics, Soliton, 0101 mathematics, Complex manifold, Mathematical physics, Scalar curvature, Mathematics

Abstract

Let [Formula: see text] be a compact complex manifold of complex dimension [Formula: see text] endowed with a Hermitian metric [Formula: see text]. The Chern-Yamabe problem is to find a conformal metric of [Formula: see text] such that its Chern scalar curvature is constant. In this paper, we prove that the solution to the Chern-Yamabe problem is unique under some conditions. On the other hand, we obtain some results related to the Chern-Yamabe soliton.

Published

2021

2. On the Ricci–Bourguignon flow

Author

Pak Tung Ho

Subjects

010101 applied mathematics, Flow (mathematics), General Mathematics, 010102 general mathematics, Mathematical analysis, Geometric flow, Mathematics::Differential Geometry, Soliton, 0101 mathematics, Constant (mathematics), 01 natural sciences, Mathematics

Abstract

In this paper, we study the Ricci–Bourguignon flow of all locally homogenous geometries on closed three-dimensional manifolds. We also consider the evolution of the Yamabe constant under the Ricci–Bourguignon flow. Finally, we prove some results for the Bach-flat shrinking gradient soliton to the Ricci–Bourguignon flow.

Published

2020

3. RESULTS RELATED TO PRESCRIBING PSEUDO-HERMITIAN SCALAR CURVATURE

Author

Pak Tung Ho

Subjects

Mean curvature flow, General Mathematics, Prescribed scalar curvature problem, Yamabe flow, Mathematical analysis, Geometric flow, CR manifold, Mathematics::Differential Geometry, Curvature, Yamabe invariant, Scalar curvature, Mathematics

Abstract

In this paper, we consider the problem of prescribing pseudo-Hermitian scalar curvature on a compact strictly pseudoconvex CR manifold M. Using geometric flow, we prove that for any negative smooth function f we can prescribe the pseudo-Hermitian scalar curvature to be f, provided that dim M = 3 and the CR Yamabe invariant of M is negative. On the other hand, we establish some uniqueness and non-uniqueness results on prescribing pseudo-Hermitian scalar curvature.

Published

2013

4. THE LONG-TIME EXISTENCE AND CONVERGENCE OF THE CR YAMABE FLOW

Author

Pak Tung Ho

Subjects

Pointwise, Applied Mathematics, General Mathematics, Yamabe flow, Mathematical analysis, CR manifold, Conformal map, Mathematics::Differential Geometry, Sectional curvature, Invariant (mathematics), Eigenvalues and eigenvectors, Mathematics, Scalar curvature

Abstract

In this paper, we prove the long-time existence of the CR Yamabe flow on the compact strictly pseudoconvex CR manifold with positive CR invariant. We also prove the convergence of the CR Yamabe flow on the sphere by proving that: the contact form which is pointwise conformal to the standard contact form on the sphere converges exponentially to a contact form of constant pseudo-Hermitian sectional curvature. We also show that the eigenvalues of some geometric operators are non-decreasing under the unnormalized CR Yamabe flow provided that the pseudo-Hermitian scalar curvature satisfies certain conditions.

Published

2012