The numerical solution of the harmonic heat map flow problems with blowup in finite or infinite time is considered using an adaptive moving mesh method. A properly chosen monitor function is derived so that the moving mesh method can be used to simulate blowup and produce accurate blowup profiles which agree with formal asymptotic analysis. Moreover, the moving mesh method has finite time blowup when the underlying continuous problem does. In situations where the continuous problem has infinite time blowup, the moving mesh method exhibits finite time blowup with a blowup time tending to infinity as the number of mesh points increases. The inadequacy of a uniform mesh solution is clearly demonstrated
This paper focuses on efficiently numerical investigation of two-dimensional heat conduction problem...
Abstract. In this work we demonstrate some recent progress on moving mesh methods with application t...
We analyse the finite-time blow-up of solutions of the heat flow for k-corotational maps $\mathbb{R}...
Abstract. The numerical solution of the harmonic heat map flow problems with blowup in finite or inf...
We consider the harmonic map heat flow from the three-dimensional ball to the two-sphere. We establi...
This is the published version, also available here: http://dx.doi.org/10.1137/S1064827594272025.In t...
AbstractThis paper studies the numerical solution of a reaction–diffusion differential equation with...
AbstractIn this paper we implement the moving mesh PDE method for simulating the blowup in reaction–...
We settle a number of questions about the possible behaviour of the harmonic map heat flow at finite...
We propose a moving mesh adaptive approach for solving time-dependent partial differential equations...
In this paper, we present a general approach to obtain numerical schemes with good mesh properties f...
This work is concerned with the development of a space-time adaptive numerical method, based on a ri...
This work is concerned with the development of a space-time adaptive numerical method, based on a ri...
The harmonic map heat flow is a model for nematic liquid crystals and also has origins in geometry. ...
It is well known that if the solution of flow equations has regions of high spatial activity, a stan...
This paper focuses on efficiently numerical investigation of two-dimensional heat conduction problem...
Abstract. In this work we demonstrate some recent progress on moving mesh methods with application t...
We analyse the finite-time blow-up of solutions of the heat flow for k-corotational maps $\mathbb{R}...
Abstract. The numerical solution of the harmonic heat map flow problems with blowup in finite or inf...
We consider the harmonic map heat flow from the three-dimensional ball to the two-sphere. We establi...
This is the published version, also available here: http://dx.doi.org/10.1137/S1064827594272025.In t...
AbstractThis paper studies the numerical solution of a reaction–diffusion differential equation with...
AbstractIn this paper we implement the moving mesh PDE method for simulating the blowup in reaction–...
We settle a number of questions about the possible behaviour of the harmonic map heat flow at finite...
We propose a moving mesh adaptive approach for solving time-dependent partial differential equations...
In this paper, we present a general approach to obtain numerical schemes with good mesh properties f...
This work is concerned with the development of a space-time adaptive numerical method, based on a ri...
This work is concerned with the development of a space-time adaptive numerical method, based on a ri...
The harmonic map heat flow is a model for nematic liquid crystals and also has origins in geometry. ...
It is well known that if the solution of flow equations has regions of high spatial activity, a stan...
This paper focuses on efficiently numerical investigation of two-dimensional heat conduction problem...
Abstract. In this work we demonstrate some recent progress on moving mesh methods with application t...
We analyse the finite-time blow-up of solutions of the heat flow for k-corotational maps $\mathbb{R}...