In the context of numerical solution of PDEs, dynamic mesh redistribution methods (r-adaptive methods) are an important procedure for increasing the resolution in regions of interest, without modifying the connectivity of the mesh. Key to the success of these methods is that the mesh should be sufficiently refined (locally) and flexible in order to resolve evolving solution features, but at the same time not introduce errors through skewness and lack of regularity. Some state-of-the-art methods are bottom-up in that they attempt to prescribe both the local cell size and the alignment to features of the solution. However, the resulting problem is overdetermined, necessitating a compromise between these conflicting requirements. An alternativ...
Particle-based numerical methods are becoming increasingly popular for the solution of continuum mec...
Mesh parameterization is a fundamental technique in computer graphics. Our paper focuses on solving ...
AbstractA simple geometric condition that defines the class of classical (stereographic, conic and c...
In the context of numerical solution of PDEs, dynamic mesh redistribution methods (r-adaptive method...
AbstractAn equation of Monge–Ampère type has, for the first time, been solved numerically on the sur...
Abstract. The principles of mesh equidistribution and alignment play a fundamental role in the desig...
© 2014 Elsevier Inc. The principles of mesh equidistribution and alignment play a fundamental role i...
In the first part of this talk, I discuss the generation of meshes adapted to a prescribed scalar 'm...
In moving mesh methods, the underlying mesh is dynamically adapted without changing the connectivity...
This work is concerned with developing moving mesh strategies for solving problems defined on a sphe...
This work is concerned with developing moving mesh strategies for solving problems defined on a sphe...
In this talk I will consider the adaptive numerical solution of a geometric evolution law where the ...
Abstract. Many adaptive mesh methods explicitly or implicitly use equidistribution and align-ment. T...
The transport phenomena dominates geophysical fluid motions on all scales making the numerical solut...
A spherical 2D Adaptive Mesh Refinement (AMR) technique is applied to the so-called Lin-Rood advecti...
Particle-based numerical methods are becoming increasingly popular for the solution of continuum mec...
Mesh parameterization is a fundamental technique in computer graphics. Our paper focuses on solving ...
AbstractA simple geometric condition that defines the class of classical (stereographic, conic and c...
In the context of numerical solution of PDEs, dynamic mesh redistribution methods (r-adaptive method...
AbstractAn equation of Monge–Ampère type has, for the first time, been solved numerically on the sur...
Abstract. The principles of mesh equidistribution and alignment play a fundamental role in the desig...
© 2014 Elsevier Inc. The principles of mesh equidistribution and alignment play a fundamental role i...
In the first part of this talk, I discuss the generation of meshes adapted to a prescribed scalar 'm...
In moving mesh methods, the underlying mesh is dynamically adapted without changing the connectivity...
This work is concerned with developing moving mesh strategies for solving problems defined on a sphe...
This work is concerned with developing moving mesh strategies for solving problems defined on a sphe...
In this talk I will consider the adaptive numerical solution of a geometric evolution law where the ...
Abstract. Many adaptive mesh methods explicitly or implicitly use equidistribution and align-ment. T...
The transport phenomena dominates geophysical fluid motions on all scales making the numerical solut...
A spherical 2D Adaptive Mesh Refinement (AMR) technique is applied to the so-called Lin-Rood advecti...
Particle-based numerical methods are becoming increasingly popular for the solution of continuum mec...
Mesh parameterization is a fundamental technique in computer graphics. Our paper focuses on solving ...
AbstractA simple geometric condition that defines the class of classical (stereographic, conic and c...