Numerical simulation of the physical behaviour for 3D Fluid Dynamics usually requires supercomputing machine computational power to achieve some practical predictive usefulness. Usually, even in that case, minimal boundaries of convergence and stability of computed solutions, or, in other words, the global simulation precision level limits the usefulness of the simulation itself into a narrow operational space-time window. In order to avoid severe degradation of the overall required accuracy for the final global solution in finite computational resource systems, computational error propagation control requires exceptional care. Over the years many correction techniques were developed by either pure computational point of view or numeric re...
The paper is devoted to the problem of reliable control of accuracy of approximate solutions obtaine...
Numerical computation is traditionally performed using floating-point arithmetic and truncated forms...
A broad range of mathematical modeling errors of fluid flow physics and numerical approximation erro...
Numerical simulation of the physical behaviour for 3D Fluid Dynamics usually requires supercomputing...
Recent decades have seen a very rapid success in developing numerical methods based on explicit cont...
Abstract—The advent of general purpose graphics processing units (GPGPU’s) brings about a whole new ...
International audienceQuestions whether numerical simulation is reproducible or not have been report...
Michela TauferThe advent of general purpose graphics processing units (GPGPU???s) brings about a wh...
Questions whether numerical simulation is reproducible or not have been reported in severa...
Abstract. Questions whether numerical simulation is reproducible or not have been reported in severa...
This investigation is concerned with the accuracy of numerical schemes for solving partial different...
The use of finite-precision arithmetic generates round-off errors at each arithmetical expression so...
International audiencePost Moore's era supercomputing will certainly require more hierarchical paral...
Floating-point numbers represent only a subset of real numbers.As such, floating-point arithmetic in...
Paper presented at the 8. Conference on the Mathematics of Finite Elements and Applications held Bru...
The paper is devoted to the problem of reliable control of accuracy of approximate solutions obtaine...
Numerical computation is traditionally performed using floating-point arithmetic and truncated forms...
A broad range of mathematical modeling errors of fluid flow physics and numerical approximation erro...
Numerical simulation of the physical behaviour for 3D Fluid Dynamics usually requires supercomputing...
Recent decades have seen a very rapid success in developing numerical methods based on explicit cont...
Abstract—The advent of general purpose graphics processing units (GPGPU’s) brings about a whole new ...
International audienceQuestions whether numerical simulation is reproducible or not have been report...
Michela TauferThe advent of general purpose graphics processing units (GPGPU???s) brings about a wh...
Questions whether numerical simulation is reproducible or not have been reported in severa...
Abstract. Questions whether numerical simulation is reproducible or not have been reported in severa...
This investigation is concerned with the accuracy of numerical schemes for solving partial different...
The use of finite-precision arithmetic generates round-off errors at each arithmetical expression so...
International audiencePost Moore's era supercomputing will certainly require more hierarchical paral...
Floating-point numbers represent only a subset of real numbers.As such, floating-point arithmetic in...
Paper presented at the 8. Conference on the Mathematics of Finite Elements and Applications held Bru...
The paper is devoted to the problem of reliable control of accuracy of approximate solutions obtaine...
Numerical computation is traditionally performed using floating-point arithmetic and truncated forms...
A broad range of mathematical modeling errors of fluid flow physics and numerical approximation erro...