In this paper we propose a parallel implementation of one-step methods with stepsize control for the numerical solution of IVPs for ODEs of the form y'(t)=f(t, y(t)), y(t0)=y0. The proposed implementation is based on the fact that any one-step ODE-method on a mesh {t0n), y0 known. In a previous paper (1989) we introduced a paral iterative algorithm for the approximation of the trajectory (y0, y1,\u2026, yN), in which a block of guessed values (u00 := y0, u01,..., u0N is iterated, concurrently with respect to the index n, until an error proportional to a given iteration tolerance TOL it is reached. Here that parallel algorithm is developed further in order to perform the stepsize control strategy, according to a given step tolerance TOL st. ...
Most of the existing methods for solving ordinary differential equations (ODEs) of higher order are ...
We study time parallelism for the numerical solution of nonstiff ordinary differential equations. St...
Implicit schemes for the integration of ODEs are popular when stability is more of concern than accu...
AbstractIn this paper we propose a parallel implementation of one-step methods with stepsize control...
The parallel solution of initial value problems for ordinary differential equations (ODE-IVPs) has r...
Abstract. The parallel solution of initial value problems for ordinary differential equations (ODE-I...
A new parallel solver for ODES implementing a “parallelism across the steps ” has been recently prop...
AbstractA natural approach for giving a positive answer to the need of faster ODE solvers consists i...
It often happens that iteration processes used for solving the implicit relations arising in ODE-IVP...
In this paper we deal with Boundary Value Methods (BVMs), which are methods recently introduced for ...
The parallel solution of Initial Value Problems for Ordinary Differential Equations has become an ac...
Sequential numerical methods for integrating initial value problems (IVPs) can be prohibitively expe...
AbstractFor the numerical integration of a stiff ordinary differential equation, fully implicit Rung...
The paper maps the possibilities of exploitation of the massive parallel computational hardware (na...
Numerical methods for ordinary initial value problems that do not depend on special properties of th...
Most of the existing methods for solving ordinary differential equations (ODEs) of higher order are ...
We study time parallelism for the numerical solution of nonstiff ordinary differential equations. St...
Implicit schemes for the integration of ODEs are popular when stability is more of concern than accu...
AbstractIn this paper we propose a parallel implementation of one-step methods with stepsize control...
The parallel solution of initial value problems for ordinary differential equations (ODE-IVPs) has r...
Abstract. The parallel solution of initial value problems for ordinary differential equations (ODE-I...
A new parallel solver for ODES implementing a “parallelism across the steps ” has been recently prop...
AbstractA natural approach for giving a positive answer to the need of faster ODE solvers consists i...
It often happens that iteration processes used for solving the implicit relations arising in ODE-IVP...
In this paper we deal with Boundary Value Methods (BVMs), which are methods recently introduced for ...
The parallel solution of Initial Value Problems for Ordinary Differential Equations has become an ac...
Sequential numerical methods for integrating initial value problems (IVPs) can be prohibitively expe...
AbstractFor the numerical integration of a stiff ordinary differential equation, fully implicit Rung...
The paper maps the possibilities of exploitation of the massive parallel computational hardware (na...
Numerical methods for ordinary initial value problems that do not depend on special properties of th...
Most of the existing methods for solving ordinary differential equations (ODEs) of higher order are ...
We study time parallelism for the numerical solution of nonstiff ordinary differential equations. St...
Implicit schemes for the integration of ODEs are popular when stability is more of concern than accu...