We present a detailed comparison between two adaptive numerical approaches to solve partial differential equations (PDEs), adaptive multiresolution (MR) and adaptive mesh refinement (AMR). Both discretizations are based on finite volumes in space with second order shock-capturing, and explicit time integration either with or without local time-stepping. The two methods are benchmarked for the compressible Euler equations in Cartesian geometry. As test cases a 2D Riemann problem, Lax-Liu 6, and a 3D ellipsoidally expanding shock wave have been chosen. We compare and assess their computational efficiency in terms of CPU time and memory requirements. We evaluate the accuracy by comparing the results of the adaptive computations with those obta...
This work is divided into two parts, which both concern the solution of problems in fluid dynamics :...
A novel adaptive mesh refinement method is proposed. The novelty of the method lies in using a dual ...
A three-dimensional solution-adaptive Euler flow solver for unstructured tetrahedral meshes is asses...
International audienceWe present a detailed comparison between two adaptive numerical approaches to ...
We present adaptive multiresolution (MR) computations of the two-dimensional compressible Euler equa...
Résumé. Nous présentons des simulations adaptatives multirésolution (MR) des équations d’Euler ...
International audienceDynamic mesh adaptation methods require suitable refinement indicators. In the...
Structured adaptive mesh refinement (SAMR) techniques can enable cutting-edge simulations of problem...
In the present study, a scheme capable of solving very fast and robust complex nonlinear systems of ...
International audienceA space-time adaptive method is presented for the reactive Euler equations des...
Simulating transient compressible flows involving shock waves presents challenges to the CFD practi...
A high-order adaptive finite-volume method is presented for simulating inviscid compressible flows o...
This work develops finite element methods with high order stabilization, and robust and efficient ad...
Abstract. These lecture notes present adaptive multiresolution schemes for evolutionary PDEs in Cart...
The compressible Euler equations describe the motion of compressible inviscid fluids. They are used ...
This work is divided into two parts, which both concern the solution of problems in fluid dynamics :...
A novel adaptive mesh refinement method is proposed. The novelty of the method lies in using a dual ...
A three-dimensional solution-adaptive Euler flow solver for unstructured tetrahedral meshes is asses...
International audienceWe present a detailed comparison between two adaptive numerical approaches to ...
We present adaptive multiresolution (MR) computations of the two-dimensional compressible Euler equa...
Résumé. Nous présentons des simulations adaptatives multirésolution (MR) des équations d’Euler ...
International audienceDynamic mesh adaptation methods require suitable refinement indicators. In the...
Structured adaptive mesh refinement (SAMR) techniques can enable cutting-edge simulations of problem...
In the present study, a scheme capable of solving very fast and robust complex nonlinear systems of ...
International audienceA space-time adaptive method is presented for the reactive Euler equations des...
Simulating transient compressible flows involving shock waves presents challenges to the CFD practi...
A high-order adaptive finite-volume method is presented for simulating inviscid compressible flows o...
This work develops finite element methods with high order stabilization, and robust and efficient ad...
Abstract. These lecture notes present adaptive multiresolution schemes for evolutionary PDEs in Cart...
The compressible Euler equations describe the motion of compressible inviscid fluids. They are used ...
This work is divided into two parts, which both concern the solution of problems in fluid dynamics :...
A novel adaptive mesh refinement method is proposed. The novelty of the method lies in using a dual ...
A three-dimensional solution-adaptive Euler flow solver for unstructured tetrahedral meshes is asses...