AbstractWave form modeling is used in a vast number of applications. Therefore, different methods have been developed that exhibit different strengths and weaknesses in accuracy, stability and computational cost. The latter remains a problem for most applications. Parallel programming has had a large impact on wave field modeling since the solution of the wave equation can be divided into independent steps. The finite difference solution of the wave equation is particularly suitable for GPU acceleration; however, one problem is the rather limited global memory current GPUs are equipped with. For this reason, most large-scale applications require multiple GPUs to be employed. This paper proposes a method to optimally distribute the workload ...
Finite difference methods for solving the wave equation more accurately capture the physics of waves...
This project serves to apply numerical methods to obtain solutions for the wave equation. Paralleliz...
An energy- and enstrophy-conserving and optimally-dispersive numerical scheme for the shallow- water...
Modeling problems that require the simulation of hyperbolic PDEs (wave equations) on large heteroge...
Large-scale simulations of wave-type equations have many industrial applications, such as in oil and...
In modern physics it has become common to find the solution of a problem by solving numerically a se...
International audienceWe present a parallel solver for wave propagation problems based on the higher...
Every wave solver serving the computational study of waves meets a trade-off of two figures of merit...
The GPU performance of the adaptive wave propagation algorithm is critical to its effectiveness in s...
International audienceThe time domain simulation of wave propagation phenomena is a computationally ...
This thesis describes the development of a fully nonlinear numerical model for the simulation of su...
Among different discretization approaches, Finite Difference Method (FDM) is widely used for acousti...
We describe the application of domain decomposition on a boundary integral method for the study of n...
Three-dimensional reverse-time migration with the constant-density acoustic wave equation requires a...
Finite difference methods for solving the wave equation more accurately capture the physics of waves...
Finite difference methods for solving the wave equation more accurately capture the physics of waves...
This project serves to apply numerical methods to obtain solutions for the wave equation. Paralleliz...
An energy- and enstrophy-conserving and optimally-dispersive numerical scheme for the shallow- water...
Modeling problems that require the simulation of hyperbolic PDEs (wave equations) on large heteroge...
Large-scale simulations of wave-type equations have many industrial applications, such as in oil and...
In modern physics it has become common to find the solution of a problem by solving numerically a se...
International audienceWe present a parallel solver for wave propagation problems based on the higher...
Every wave solver serving the computational study of waves meets a trade-off of two figures of merit...
The GPU performance of the adaptive wave propagation algorithm is critical to its effectiveness in s...
International audienceThe time domain simulation of wave propagation phenomena is a computationally ...
This thesis describes the development of a fully nonlinear numerical model for the simulation of su...
Among different discretization approaches, Finite Difference Method (FDM) is widely used for acousti...
We describe the application of domain decomposition on a boundary integral method for the study of n...
Three-dimensional reverse-time migration with the constant-density acoustic wave equation requires a...
Finite difference methods for solving the wave equation more accurately capture the physics of waves...
Finite difference methods for solving the wave equation more accurately capture the physics of waves...
This project serves to apply numerical methods to obtain solutions for the wave equation. Paralleliz...
An energy- and enstrophy-conserving and optimally-dispersive numerical scheme for the shallow- water...