This work considers the Real Leja Points Method (ReLPM), for the exponential integration of large-scale sparse systems of ODEs, generated by Finite Element or Finite Difference discretizations of 3-D advection-diffusion models. A scalability analysis of the most important computational kernel inside the code, the parallel sparse matrix-vector product has been performed as well as an experimental study of the communication overhead. As a result of this study an optimized parallel sparse matrix-vector product routine has been implemented. The resulting code shows good scaling behavior even when using more than one thousand processors. The numerical results presented on a number of very large test cases gives experimental evidence that the ...
Exponential integrators have received renewed interest in recent years as a means to approximate sti...
We consider advection-diffusion problems whose solution exhibits an oscillatory behaviour, such as th...
\u3cp\u3eConservation laws of advection-diffusion-reaction (ADR) type are ubiquitous in continuum ph...
4This work considers the Real Leja Points Method (ReLPM), for the exponential integration of large-s...
AbstractThis work considers the Real Leja Points Method (ReLPM), [M. Caliari, M. Vianello, L. Bergam...
We propose a parallel implementation of the ReLPM (Real Leja Points Method) for the exponential inte...
We implement an exponential integrator for large and sparse systems of ODEs, generated by FE (Finite...
We have implemented a numerical code (ReLPM, Real Leja Points Method) for polynomial interpolation o...
We implement a second-order exponential integrator for semidiscretized advection-diffusion-reaction ...
Flow problems permeate hydraulic engineering. In order to solve real--life problems, parallel sol...
AbstractWe implement a second-order exponential integrator for semidiscretized advection–diffusion–r...
We propose and analyze the ReLPM (Real Leja Points Method) for evaluating the propagator f(hB)v via ...
We propose and analyze the ReLPM (Real Leja Points Method) for evaluating the propagator phi(DeltatB...
AbstractWe propose and analyze the ReLPM (Real Leja Points Method) for evaluating the propagator ϕ(Δ...
This paper describes and tests a parallel implementation of a factorized approximate inverse precond...
Exponential integrators have received renewed interest in recent years as a means to approximate sti...
We consider advection-diffusion problems whose solution exhibits an oscillatory behaviour, such as th...
\u3cp\u3eConservation laws of advection-diffusion-reaction (ADR) type are ubiquitous in continuum ph...
4This work considers the Real Leja Points Method (ReLPM), for the exponential integration of large-s...
AbstractThis work considers the Real Leja Points Method (ReLPM), [M. Caliari, M. Vianello, L. Bergam...
We propose a parallel implementation of the ReLPM (Real Leja Points Method) for the exponential inte...
We implement an exponential integrator for large and sparse systems of ODEs, generated by FE (Finite...
We have implemented a numerical code (ReLPM, Real Leja Points Method) for polynomial interpolation o...
We implement a second-order exponential integrator for semidiscretized advection-diffusion-reaction ...
Flow problems permeate hydraulic engineering. In order to solve real--life problems, parallel sol...
AbstractWe implement a second-order exponential integrator for semidiscretized advection–diffusion–r...
We propose and analyze the ReLPM (Real Leja Points Method) for evaluating the propagator f(hB)v via ...
We propose and analyze the ReLPM (Real Leja Points Method) for evaluating the propagator phi(DeltatB...
AbstractWe propose and analyze the ReLPM (Real Leja Points Method) for evaluating the propagator ϕ(Δ...
This paper describes and tests a parallel implementation of a factorized approximate inverse precond...
Exponential integrators have received renewed interest in recent years as a means to approximate sti...
We consider advection-diffusion problems whose solution exhibits an oscillatory behaviour, such as th...
\u3cp\u3eConservation laws of advection-diffusion-reaction (ADR) type are ubiquitous in continuum ph...