Abstract. In this work we study the problem of step size selection for numer-ical schemes, which guarantees that the numerical solution presents the same qualitative behavior as the original system of ordinary differential equations. We apply tools from nonlinear control theory, specifically Lyapunov function and small-gain based feedback stabilization methods for systems with a glob-ally asymptotically stable equilibrium point. Proceeding this way, we derive conditions under which the step size selection problem is solvable (including a nonlinear generalization of the well-known A-stability property for the implicit Euler scheme) as well as step size selection strategies for several applications. 1. Introduction. I
When a system of ordinary differential equations is solved using a step-by-step method it is often ...
AbstractThe choice of initial step size is critical for the reliable numerical solution of the initi...
In this paper we extend the notions of sample and Euler stabilizability to a set of a control system...
Abstract. In this work we study the problem of step size selection for numerical schemes, which guar...
AbstractA very simple way of selecting the step size when solving an initial problem for a system of...
A scheme for stabilizing stochastic approximation iterates by adaptively scaling the step sizes is p...
Implicit schemes for the integration of ODEs are popular when stability is more of concern than accu...
Implicit schemes for the integration of ODE's are popular when stabil ity is more of concern than...
The efficiency of numerical time-stepping methods for dynamical systems is greatly enhanced by autom...
In recent years several proposals for the step-size selection have largely improved the gradient met...
AbstractThis paper deals with the stability analysis of one-step methods for the numerical solution ...
The efficiency of numerical time–stepping methods for dynamical systems is greatly enhanced by autom...
Abstract. This paper concerns the theoretical analysis of step-by-step meth-ods for solving initial ...
In this dissertation we consider the stability of numerical methods approximating the solution of bo...
We consider the simplest design problem for nonlinear systems: the problem of rendering asymptotical...
When a system of ordinary differential equations is solved using a step-by-step method it is often ...
AbstractThe choice of initial step size is critical for the reliable numerical solution of the initi...
In this paper we extend the notions of sample and Euler stabilizability to a set of a control system...
Abstract. In this work we study the problem of step size selection for numerical schemes, which guar...
AbstractA very simple way of selecting the step size when solving an initial problem for a system of...
A scheme for stabilizing stochastic approximation iterates by adaptively scaling the step sizes is p...
Implicit schemes for the integration of ODEs are popular when stability is more of concern than accu...
Implicit schemes for the integration of ODE's are popular when stabil ity is more of concern than...
The efficiency of numerical time-stepping methods for dynamical systems is greatly enhanced by autom...
In recent years several proposals for the step-size selection have largely improved the gradient met...
AbstractThis paper deals with the stability analysis of one-step methods for the numerical solution ...
The efficiency of numerical time–stepping methods for dynamical systems is greatly enhanced by autom...
Abstract. This paper concerns the theoretical analysis of step-by-step meth-ods for solving initial ...
In this dissertation we consider the stability of numerical methods approximating the solution of bo...
We consider the simplest design problem for nonlinear systems: the problem of rendering asymptotical...
When a system of ordinary differential equations is solved using a step-by-step method it is often ...
AbstractThe choice of initial step size is critical for the reliable numerical solution of the initi...
In this paper we extend the notions of sample and Euler stabilizability to a set of a control system...