Add to ORKGThe classical Stefan problem is a linear onedimensional heat equation with a free boundary at one end, modelling a column of liquid (e.g. water) in contact with an infinite strip of solid (ice). Given the fixed boundary conditions, the column temperature and free boundary motion can be uniquely determined. In the inverse problem, one specifies the free boundary motion, say from one steady-state length to another, and seeks to determine the column temperature and fixed boundary conditions, or boundary control. This motion planning problem is a simplified version of a crystal growth problem. In this paper, we consider motion planning of the free boundary (Stefan) problem with a quadratic nonlinear reaction term. The treatment here is a first ...
AbstractWe consider a one-dimensional two-phase Stefan problem, modeling a layer of solid material f...
A solidification process for a semi-infinite material is presented through a non-linear two-phase un...
Charlie’s method [2-4], an explicit predictor-corrector ?nite di?erence-based scheme, is applied to ...
In this paper we consider a free boundary problem for a nonlinear parabolic partial differential equ...
Abstract. In this paper we consider a free boundary problem for a nonlinear parabolic partial dif-fe...
We treat two related moving boundary problems. The first is the ill-posed Stefan problem for meltin...
We treat two related moving boundary problems. The first is the ill-posed Stefan problem for meltin...
This paper deals with the exact controllability to the trajectories of the one-phase Stefan problem ...
We treat two related moving boundary problems. The first is the ill-posed Stefan problem for meltin...
We treat two related moving boundary problems. The first is the ill-posed Stefan problem for meltin...
A two-phase free boundary problem associated with nonlinear heat conduction is con-sidered. The prob...
My thesis focuses on the evolution of the solid-liquid interface during melting and solidication in ...
A Stefan problem is a problem involving a parabolic differential equation with a moving boundary. W...
A solidification process for a semi-infinite material is presented through a non-linear two-phase un...
A two-dimensional Stefan problem is usually introduced as a model of solidification, melting or subl...
AbstractWe consider a one-dimensional two-phase Stefan problem, modeling a layer of solid material f...
A solidification process for a semi-infinite material is presented through a non-linear two-phase un...
Charlie’s method [2-4], an explicit predictor-corrector ?nite di?erence-based scheme, is applied to ...
In this paper we consider a free boundary problem for a nonlinear parabolic partial differential equ...
Abstract. In this paper we consider a free boundary problem for a nonlinear parabolic partial dif-fe...
We treat two related moving boundary problems. The first is the ill-posed Stefan problem for meltin...
We treat two related moving boundary problems. The first is the ill-posed Stefan problem for meltin...
This paper deals with the exact controllability to the trajectories of the one-phase Stefan problem ...
We treat two related moving boundary problems. The first is the ill-posed Stefan problem for meltin...
We treat two related moving boundary problems. The first is the ill-posed Stefan problem for meltin...
A two-phase free boundary problem associated with nonlinear heat conduction is con-sidered. The prob...
My thesis focuses on the evolution of the solid-liquid interface during melting and solidication in ...
A Stefan problem is a problem involving a parabolic differential equation with a moving boundary. W...
A solidification process for a semi-infinite material is presented through a non-linear two-phase un...
A two-dimensional Stefan problem is usually introduced as a model of solidification, melting or subl...
AbstractWe consider a one-dimensional two-phase Stefan problem, modeling a layer of solid material f...
A solidification process for a semi-infinite material is presented through a non-linear two-phase un...
Charlie’s method [2-4], an explicit predictor-corrector ?nite di?erence-based scheme, is applied to ...