Abstract. In this work we study the problem of step size selection for numerical schemes, which guarantees that the numerical solution presents the same qualitative behavior as the original system of ordinary differential equations, by means of tools from nonlinear control theory. Lyapunov-based stabilization methods are exploited
Motivated by some recent results on the stabilization of homogeneous systems, we present a gain-sche...
Navasca† Algebraic Riccati equations (ARE) of large dimension arise when using approxima-tions to de...
AbstractIt is well known that the application of one-step or linear multistep methods to an ordinary...
Abstract. In this work we study the problem of step size selection for numer-ical schemes, which gua...
AbstractA very simple way of selecting the step size when solving an initial problem for a system of...
A trajectory following method for solving optimization problems is based on the idea of solving ordi...
We consider the simplest design problem for nonlinear systems: the problem of rendering asymptotical...
Numerical solutions for the optimal feedback stabilization of discrete time dynamical systems is the...
AbstractThis paper deals with the stability analysis of one-step methods for the numerical solution ...
The paper presents algorithms for stabilization of linear stationary controlled systems of ordinary ...
We introduce here a simple finite-dimensional feedback control scheme for stabilizing solutions of i...
In this dissertation we consider the stability of numerical methods approximating the solution of bo...
The possibilities of modern computing and measuring technologies allow using the most adequate mathe...
Abstract. For bilinear control systems with constrained control values extremal Lyapunov exponents a...
In this Thesis the topics of integration, analysis and control of nonlinear differential-algebraic s...
Motivated by some recent results on the stabilization of homogeneous systems, we present a gain-sche...
Navasca† Algebraic Riccati equations (ARE) of large dimension arise when using approxima-tions to de...
AbstractIt is well known that the application of one-step or linear multistep methods to an ordinary...
Abstract. In this work we study the problem of step size selection for numer-ical schemes, which gua...
AbstractA very simple way of selecting the step size when solving an initial problem for a system of...
A trajectory following method for solving optimization problems is based on the idea of solving ordi...
We consider the simplest design problem for nonlinear systems: the problem of rendering asymptotical...
Numerical solutions for the optimal feedback stabilization of discrete time dynamical systems is the...
AbstractThis paper deals with the stability analysis of one-step methods for the numerical solution ...
The paper presents algorithms for stabilization of linear stationary controlled systems of ordinary ...
We introduce here a simple finite-dimensional feedback control scheme for stabilizing solutions of i...
In this dissertation we consider the stability of numerical methods approximating the solution of bo...
The possibilities of modern computing and measuring technologies allow using the most adequate mathe...
Abstract. For bilinear control systems with constrained control values extremal Lyapunov exponents a...
In this Thesis the topics of integration, analysis and control of nonlinear differential-algebraic s...
Motivated by some recent results on the stabilization of homogeneous systems, we present a gain-sche...
Navasca† Algebraic Riccati equations (ARE) of large dimension arise when using approxima-tions to de...
AbstractIt is well known that the application of one-step or linear multistep methods to an ordinary...