This thesis presents new numerical methods for solving differential equations with periodicity. Spectral methods for solving linear and nonlinear ODEs, linear ODE eigenvalue problems and linear time-dependent PDEs on a periodic interval are reviewed, and a novel approach for computing multiplication matrices is presented. Choreographies, periodic solutions of the n-body problem that share a common orbit, are computed for the first time to high accuracy using an algorithm based on approximation by trigonometric polynomials and optimization techniques with exact gradient and exact Hessian matrix. New choreographies in spaces of constant curvature are found. Exponential integrators for solving periodic semilinear stiff PDEs in 1D, 2D and 3...
Linear periodic systems originate in various control fields involving periodic phenomena. In the beg...
AbstractSystems of autonomous first-order ordinary differential equations are considered (dimension ...
We consider the construction of Runge-Kutta(-Nystrom) methods for ordinary differential equations wh...
This thesis presents new numerical methods for solving differential equations with periodicity. Spec...
Dozens of exponential integration formulas have been proposed for the high-accuracy solution of stif...
We present in this paper algorithms for solving stiff PDEs on the unit sphere with spectral accuracy...
The study deals with periodic problems for nonlinear differential and integro-differential equations...
The numerical solution of real-life models cannot disregard the behavior of the analytical solution ...
We present in this work two schemes of approximation for numerical solutions of PDEs. The first one ...
We consider numerical methods for the computation and continuation of the three generic secondary p...
It is the purpose of this talk to present recent advances in the numerical solution of piecewise smo...
AbstractWe consider the construction of methods based on trigonometric polynomials for the initial v...
It is the purpose of this talk to analyze the behaviour of some classes of numerical methods acting ...
A rational Arnoldi method, for computing the action of a matrix function, is applied in the construc...
Linear periodic systems originate in various control fields involving periodic phenomena. In the beg...
AbstractSystems of autonomous first-order ordinary differential equations are considered (dimension ...
We consider the construction of Runge-Kutta(-Nystrom) methods for ordinary differential equations wh...
This thesis presents new numerical methods for solving differential equations with periodicity. Spec...
Dozens of exponential integration formulas have been proposed for the high-accuracy solution of stif...
We present in this paper algorithms for solving stiff PDEs on the unit sphere with spectral accuracy...
The study deals with periodic problems for nonlinear differential and integro-differential equations...
The numerical solution of real-life models cannot disregard the behavior of the analytical solution ...
We present in this work two schemes of approximation for numerical solutions of PDEs. The first one ...
We consider numerical methods for the computation and continuation of the three generic secondary p...
It is the purpose of this talk to present recent advances in the numerical solution of piecewise smo...
AbstractWe consider the construction of methods based on trigonometric polynomials for the initial v...
It is the purpose of this talk to analyze the behaviour of some classes of numerical methods acting ...
A rational Arnoldi method, for computing the action of a matrix function, is applied in the construc...
Linear periodic systems originate in various control fields involving periodic phenomena. In the beg...
AbstractSystems of autonomous first-order ordinary differential equations are considered (dimension ...
We consider the construction of Runge-Kutta(-Nystrom) methods for ordinary differential equations wh...