Add to ORKGWe study m-corotational solutions to the Harmonic Map Heat Flow from R2 to S2. We first consider maps of zero topological degree, with initial energy below the threshold given by twice the energy of the harmonic map solutions. For m≥2, we establish the smooth global existence and decay of such solutions via the concentration-compactness approach of Kenig-Merle, recovering classical results of Struwe by this alternate method. The proof relies on a profile decomposition, and the energy dissipation relation. We then consider maps of degree m and initial energy above the harmonic map threshold energy, but below three times this energy. For m≥4, we establish the smooth global existence of such solutions, and their decay to a harmonic map (stabil...
We show how a rigidity estimate introduced in recent work of Bernand-Mantel, Muratov and Simon can b...
We study singularity formation for the harmonic map flow from a two dimensional domain into the sphe...
We consider the heat flow of corotational harmonic maps from R3 to the three-sphere and prove the no...
The main focus of this thesis is on critical parabolic problems, in particular, the harmonic map he...
The main focus of this thesis is on critical parabolic problems, in particular, the harmonic map he...
AbstractFor degree-one equivariant maps on bounded domains, the question of finite-time blow-up vs. ...
We analyse the finite-time blow-up of solutions of the heat flow for k-corotational maps $\mathbb{R}...
In this paper, we study the energy critical 1-equivariant Landau-Lifschitz flow mapping $\mathbb{R}^...
We construct finite time blow-up solutions to the 2-dimensional harmonic map flow into the sphere $S...
© 2019, Springer-Verlag GmbH Germany, part of Springer Nature.We construct finite time blow-up solut...
We analyse finite-time singularities of the Teichmüller harmonic map flow — a natural gradient flow ...
We study the heat flow of p-harmonic maps between complete Riemannian manifolds. We prove the global...
In this paper we show that the heat flow $u(x,t)$ with a rotationally symmetric initial map $u_0(x,t...
In this paper we show that the heat flow $u(x,t)$ with a rotationally symmetric initial map $u_0(x,t...
We study singularity formation for the harmonic map flow from a two dimensional domain into the sphe...
We show how a rigidity estimate introduced in recent work of Bernand-Mantel, Muratov and Simon can b...
We study singularity formation for the harmonic map flow from a two dimensional domain into the sphe...
We consider the heat flow of corotational harmonic maps from R3 to the three-sphere and prove the no...
The main focus of this thesis is on critical parabolic problems, in particular, the harmonic map he...
The main focus of this thesis is on critical parabolic problems, in particular, the harmonic map he...
AbstractFor degree-one equivariant maps on bounded domains, the question of finite-time blow-up vs. ...
We analyse the finite-time blow-up of solutions of the heat flow for k-corotational maps $\mathbb{R}...
In this paper, we study the energy critical 1-equivariant Landau-Lifschitz flow mapping $\mathbb{R}^...
We construct finite time blow-up solutions to the 2-dimensional harmonic map flow into the sphere $S...
© 2019, Springer-Verlag GmbH Germany, part of Springer Nature.We construct finite time blow-up solut...
We analyse finite-time singularities of the Teichmüller harmonic map flow — a natural gradient flow ...
We study the heat flow of p-harmonic maps between complete Riemannian manifolds. We prove the global...
In this paper we show that the heat flow $u(x,t)$ with a rotationally symmetric initial map $u_0(x,t...
In this paper we show that the heat flow $u(x,t)$ with a rotationally symmetric initial map $u_0(x,t...
We study singularity formation for the harmonic map flow from a two dimensional domain into the sphe...
We show how a rigidity estimate introduced in recent work of Bernand-Mantel, Muratov and Simon can b...
We study singularity formation for the harmonic map flow from a two dimensional domain into the sphe...
We consider the heat flow of corotational harmonic maps from R3 to the three-sphere and prove the no...