We study time parallelism for the numerical solution of nonstiff ordinary differential equations. Stability and accuracy are the two main considerations in deriving good numerical o.d.e. methods. However, existing parallel methods have poor stability properties in that their stability regions are smaller than those of good sequential methods of the same order. In this thesis we present a precise understanding of how stability limits the potential of parallelism in o.d.e.'s. We propose a fairly specific approach to construct good parallel methods--we consider zero-stable parallel methods whose stability polynomials are perfect powers of those of simple methods with good stability regions. Based on this approach we derive new efficient parall...
The availability of high-performance computing tools gives the opportunity of solving mathematical r...
Since most partial differential equations (PDEs) do not have exact solutions, they are usually solve...
Stability and efficiency (i.e. derivative function evaluations per processor) are the two main consi...
We study time parallelism for the numerical solution of nonstiff ordinary differential equations. St...
In this contribution, we consider the one-block method designed by W. Couzy, B.P. Sommeijer and P.J....
The n ed for effective parallel methods for solving problems in science and engineering well recogni...
This paper examines the potential of parallel computation methods for pamal differential equations (...
We consider numerical methods for nonstiff initial-value problems for Volterra integro-differential ...
The parallel solution of initial value problems for ordinary differential equations (ODE-IVPs) has r...
The numerical solution of ordinary differential equations (ODE's) can be a computationally intensive...
This paper examines the potential of parallel computation methods for partial differential equations...
The parallel solution of initial value problems for ordinary differential equations (ODE-IVPs) has b...
The parallel solution of Initial Value Problems for Ordinary Differential Equations has become an ac...
In this paper, parallelism in the solution of Ordinary Differential Equations (ODEs) to increase th...
Most of the existing methods for solving ordinary differential equations (ODEs) of higher order are ...
The availability of high-performance computing tools gives the opportunity of solving mathematical r...
Since most partial differential equations (PDEs) do not have exact solutions, they are usually solve...
Stability and efficiency (i.e. derivative function evaluations per processor) are the two main consi...
We study time parallelism for the numerical solution of nonstiff ordinary differential equations. St...
In this contribution, we consider the one-block method designed by W. Couzy, B.P. Sommeijer and P.J....
The n ed for effective parallel methods for solving problems in science and engineering well recogni...
This paper examines the potential of parallel computation methods for pamal differential equations (...
We consider numerical methods for nonstiff initial-value problems for Volterra integro-differential ...
The parallel solution of initial value problems for ordinary differential equations (ODE-IVPs) has r...
The numerical solution of ordinary differential equations (ODE's) can be a computationally intensive...
This paper examines the potential of parallel computation methods for partial differential equations...
The parallel solution of initial value problems for ordinary differential equations (ODE-IVPs) has b...
The parallel solution of Initial Value Problems for Ordinary Differential Equations has become an ac...
In this paper, parallelism in the solution of Ordinary Differential Equations (ODEs) to increase th...
Most of the existing methods for solving ordinary differential equations (ODEs) of higher order are ...
The availability of high-performance computing tools gives the opportunity of solving mathematical r...
Since most partial differential equations (PDEs) do not have exact solutions, they are usually solve...
Stability and efficiency (i.e. derivative function evaluations per processor) are the two main consi...