Add to ORKGWe study singularity formation for the harmonic map flow from a two dimensional domain into the sphere. We show that for suit- able initial conditions the flow develops a type 2 singularity at some point in finite time, and that this is stable under small perturbations of the initial condition. This phenomenon and the rate of blow up were studied formally by van den Berg, Hulshof and King (2003) and proved by Raphael and Schweyer (2013) in the class of radial and 1- corrotationally symmetric maps. Our results hold without any symme- try assumptions.Non UBCUnreviewedAuthor affiliation: Universidad de Chile, Departamento de Ingenieria Matematica and Centro de Modelamiento MatemáticoFacult
We study the phenomena of energy concentration for the critical O.3 / sigma model, also known as the...
We consider the harmonic map heat flow from the three-dimensional ball to the two-sphere. We establi...
We give a description of singularity formation in terms of energy quanta for 2-dimensional radially ...
We study singularity formation for the harmonic map flow from a two dimensional domain into the sphe...
© 2019, Springer-Verlag GmbH Germany, part of Springer Nature.We construct finite time blow-up solut...
We study singularity formation in the harmonic map flow from a two dimensional domain into S2 and sh...
We construct finite time blow-up solutions to the 2-dimensional harmonic map flow into the sphere $S...
We settle a number of questions about the possible behaviour of the harmonic map heat flow at finite...
In this paper, we construct a new type of singularity which may occur in weak solutions of the harmo...
We analyse the finite-time blow-up of solutions of the heat flow for k-corotational maps $\mathbb{R}...
The 1-harmonic flow from the disk to the sphere with constant Dirichlet boundary conditions is analy...
In this thesis we study singularity formation in two basic nonlinear equations in $n$ dimensions: no...
In this thesis we study singularity formation in two basic nonlinear equations in $n$ dimensions: no...
The harmonic map heat flow is a model for nematic liquid crystals and also has origins in geom-etry....
The harmonic map heat flow is a model for nematic liquid crystals and also has origins in geometry. ...
We study the phenomena of energy concentration for the critical O.3 / sigma model, also known as the...
We consider the harmonic map heat flow from the three-dimensional ball to the two-sphere. We establi...
We give a description of singularity formation in terms of energy quanta for 2-dimensional radially ...
We study singularity formation for the harmonic map flow from a two dimensional domain into the sphe...
© 2019, Springer-Verlag GmbH Germany, part of Springer Nature.We construct finite time blow-up solut...
We study singularity formation in the harmonic map flow from a two dimensional domain into S2 and sh...
We construct finite time blow-up solutions to the 2-dimensional harmonic map flow into the sphere $S...
We settle a number of questions about the possible behaviour of the harmonic map heat flow at finite...
In this paper, we construct a new type of singularity which may occur in weak solutions of the harmo...
We analyse the finite-time blow-up of solutions of the heat flow for k-corotational maps $\mathbb{R}...
The 1-harmonic flow from the disk to the sphere with constant Dirichlet boundary conditions is analy...
In this thesis we study singularity formation in two basic nonlinear equations in $n$ dimensions: no...
In this thesis we study singularity formation in two basic nonlinear equations in $n$ dimensions: no...
The harmonic map heat flow is a model for nematic liquid crystals and also has origins in geom-etry....
The harmonic map heat flow is a model for nematic liquid crystals and also has origins in geometry. ...
We study the phenomena of energy concentration for the critical O.3 / sigma model, also known as the...
We consider the harmonic map heat flow from the three-dimensional ball to the two-sphere. We establi...
We give a description of singularity formation in terms of energy quanta for 2-dimensional radially ...