In this paper, we consider numerical methods for the location of events of differential algebraic equations of index one. These events correspond to cross a discontinuity surface, beyond which another differential algebraic equation holds. Convergence theorems of the numerical event time and event point to the true event time and event point are given. It is proved that, for integrations by semi-implicit methods or Rosenbrock methods, the order of convergence of the numerical event location is the order of convergence of the continuous extension and, for integration by implicit Runge-Kutta methods, the order of convergence is the order of convergence of the implicit RK method
In this paper we will study the numerical solution of a discontinuous differential system by a Rosen...
summary:The author defines the numerical solution of a first order ordinary differential equation on...
An algorithm for the evaluatinion of discontinuity jumps in the DDE initial value problem is present...
In this paper, we consider numerical methods for the location of events of differential algebraic eq...
In this paper, we consider numerical methods for the location of events of ordinary differential equ...
In this short paper, event location techniques for a differential system the solution of which is d...
AbstractThe interpolation polynomial in the k-step Adams–Bashforth method may be used to compute the...
In this paper we consider numerical techniques to locate the event points of the differential system...
In this paper we are concerned with numerical methods for the one-sided event location in discontinu...
The interpolation polynomial in the k-step Adams-Bashforth method may be used to compute the numeric...
This work is dedicated to the memory of Donato Trigiante who has been the first teacher of Numerical...
AbstractThis work is dedicated to the memory of Donato Trigiante who has been the first teacher of N...
The assumption of sufficiently smooth derivatives underlies much of the analysis of numerical method...
We consider the numerical integration of discontinuous differential systems of ODEs of the type: x' ...
AbstractAn initial value problem for y′ = f(t, y) may have an associated event function g(t, y). An ...
In this paper we will study the numerical solution of a discontinuous differential system by a Rosen...
summary:The author defines the numerical solution of a first order ordinary differential equation on...
An algorithm for the evaluatinion of discontinuity jumps in the DDE initial value problem is present...
In this paper, we consider numerical methods for the location of events of differential algebraic eq...
In this paper, we consider numerical methods for the location of events of ordinary differential equ...
In this short paper, event location techniques for a differential system the solution of which is d...
AbstractThe interpolation polynomial in the k-step Adams–Bashforth method may be used to compute the...
In this paper we consider numerical techniques to locate the event points of the differential system...
In this paper we are concerned with numerical methods for the one-sided event location in discontinu...
The interpolation polynomial in the k-step Adams-Bashforth method may be used to compute the numeric...
This work is dedicated to the memory of Donato Trigiante who has been the first teacher of Numerical...
AbstractThis work is dedicated to the memory of Donato Trigiante who has been the first teacher of N...
The assumption of sufficiently smooth derivatives underlies much of the analysis of numerical method...
We consider the numerical integration of discontinuous differential systems of ODEs of the type: x' ...
AbstractAn initial value problem for y′ = f(t, y) may have an associated event function g(t, y). An ...
In this paper we will study the numerical solution of a discontinuous differential system by a Rosen...
summary:The author defines the numerical solution of a first order ordinary differential equation on...
An algorithm for the evaluatinion of discontinuity jumps in the DDE initial value problem is present...