Many natural and engineering systems are governed by nonlinear partial differential equations (PDEs) which result in a multiscale phenomena, e.g. turbulent flows. Numerical simulations of these problems are computationally very expensive and demand for extreme levels of parallelism. At realistic conditions, simulations are being carried out on massively parallel computers with hundreds of thousands of processing elements (PEs). It has been observed that communication between PEs as well as their synchronization at these extreme scales take up a significant portion of the total simulation time and result in poor scalability of codes. This issue is likely to pose a bottleneck in scalability of codes on future Exascale systems. In this work, w...
We propose a novel, minimally intrusive approach to adding fault tolerance to existing complex scien...
This dissertation studies the sources of poor performance in scientific computing codes based on par...
International audienceLinear and nonlinear convection-diffusion problems are considered. The numeric...
Large scale simulations are used in a variety of application areas in science and engineering to hel...
Asynchronous methods minimize idle times by removing synchronization barriers, and therefore allow t...
A major problem in achieving significant speed-up on parallel machines is the overhead involved with...
The data volume of Partial Differential Equation (PDE) based ultra-large-scale scientific simul...
Turbulent flows are known for the intermittent occurrence of intense strain rates and local rotatio...
As the discipline of scientific computing grows, so too does the "skills gap" between the increasing...
The article of record as published may be found at http://dx.doi.org/10.1155/2015/295393A Navier-Sto...
An important class of numerical methods features a scalability property well known as the Amdahl’s l...
A key issue confronting petascale and exascale computing is the growth in probability of soft and ha...
AbstractA key issue confronting petascale and exascale computing is the growth in probability of sof...
The solution of high-dimensional problems, especially high-dimensional partial differential equation...
Many petascale and exascale scientific simulations involve the time evolution of systems modelled as...
We propose a novel, minimally intrusive approach to adding fault tolerance to existing complex scien...
This dissertation studies the sources of poor performance in scientific computing codes based on par...
International audienceLinear and nonlinear convection-diffusion problems are considered. The numeric...
Large scale simulations are used in a variety of application areas in science and engineering to hel...
Asynchronous methods minimize idle times by removing synchronization barriers, and therefore allow t...
A major problem in achieving significant speed-up on parallel machines is the overhead involved with...
The data volume of Partial Differential Equation (PDE) based ultra-large-scale scientific simul...
Turbulent flows are known for the intermittent occurrence of intense strain rates and local rotatio...
As the discipline of scientific computing grows, so too does the "skills gap" between the increasing...
The article of record as published may be found at http://dx.doi.org/10.1155/2015/295393A Navier-Sto...
An important class of numerical methods features a scalability property well known as the Amdahl’s l...
A key issue confronting petascale and exascale computing is the growth in probability of soft and ha...
AbstractA key issue confronting petascale and exascale computing is the growth in probability of sof...
The solution of high-dimensional problems, especially high-dimensional partial differential equation...
Many petascale and exascale scientific simulations involve the time evolution of systems modelled as...
We propose a novel, minimally intrusive approach to adding fault tolerance to existing complex scien...
This dissertation studies the sources of poor performance in scientific computing codes based on par...
International audienceLinear and nonlinear convection-diffusion problems are considered. The numeric...