Add to ORKGIn my previous paper I have contrived a Ginzburg-Landau heat flow with a time-dependent parameter and by using it, I constructed a harmonic heat flow into spheres with a monotonical inequality and a reverse Poincar\'{e} inequality. This paper establishes these two energy inequalities near the boundary and then by making the best of them, we discuss a partial boundary regularity. In addition to it, we demonstrate a whole domain's regularity under "the one-sided condition." This has been proposed by S.Hildebrandt and K.-O.Widman
We study the regularity of weak solutions to the heat equation for H-surfaces. Under the assumption ...
We prove partial and full boundary regularity for manifold constrained (Formula presented.) -harmoni...
This manuscript demonstrates the regularity and uniqueness of some geometric heat flows with critica...
Abstract. We show a regularity criterion to the harmonic heat flow from 2-dimensional Rie-mannian ma...
We introduce a heat flow associated to half-harmonic maps, which have been introduced by Da Lio and ...
We introduce a heat flow associated to half-harmonic maps, which have been introduced by Da Lio and ...
This article studies regularity of weak solutions to the heat equation for H -- surfaces. Under the ...
This article studies regularity of weak solutions to the heat equation for H-surfaces. Under the ass...
This article studies regularity of weak solutions to the heat equation for H-surfaces. Under the ass...
In this note, we will outline the classical results of Eells-Sampson [7] on the harmonic heat flow, ...
In this note, we will outline the classical results of Eells-Sampson [7] on the harmonic heat flow, ...
We establish new local regularity results for the harmonic map and Yang–Mills heat flows on Riemanni...
We study the heat flow of p-harmonic maps between complete Riemannian manifolds. We prove the global...
We establish a Pacard-type monotonicity formula and Morrey bounds up to the boundary for smooth solu...
Submitted to: Journal of Differential GeometrySIGLETIB Hannover: RO 5389(11) / FIZ - Fachinformation...
We study the regularity of weak solutions to the heat equation for H-surfaces. Under the assumption ...
We prove partial and full boundary regularity for manifold constrained (Formula presented.) -harmoni...
This manuscript demonstrates the regularity and uniqueness of some geometric heat flows with critica...
Abstract. We show a regularity criterion to the harmonic heat flow from 2-dimensional Rie-mannian ma...
We introduce a heat flow associated to half-harmonic maps, which have been introduced by Da Lio and ...
We introduce a heat flow associated to half-harmonic maps, which have been introduced by Da Lio and ...
This article studies regularity of weak solutions to the heat equation for H -- surfaces. Under the ...
This article studies regularity of weak solutions to the heat equation for H-surfaces. Under the ass...
This article studies regularity of weak solutions to the heat equation for H-surfaces. Under the ass...
In this note, we will outline the classical results of Eells-Sampson [7] on the harmonic heat flow, ...
In this note, we will outline the classical results of Eells-Sampson [7] on the harmonic heat flow, ...
We establish new local regularity results for the harmonic map and Yang–Mills heat flows on Riemanni...
We study the heat flow of p-harmonic maps between complete Riemannian manifolds. We prove the global...
We establish a Pacard-type monotonicity formula and Morrey bounds up to the boundary for smooth solu...
Submitted to: Journal of Differential GeometrySIGLETIB Hannover: RO 5389(11) / FIZ - Fachinformation...
We study the regularity of weak solutions to the heat equation for H-surfaces. Under the assumption ...
We prove partial and full boundary regularity for manifold constrained (Formula presented.) -harmoni...
This manuscript demonstrates the regularity and uniqueness of some geometric heat flows with critica...