The stability of Runge-Kutta method for the second order delay differential equations

This paper is concerned with the study of the stability of numerical methods for a class of second order delay differential equations.

This paper discusses the nonlinear stability of implicit Euler method for delay differential equations(DDEs).

GP_d-stability of multistep runge-kutta method for neutral delay differential equations;

Exact solution s property of multi pantograph delay differential equation;

Parallel Rosenbrock method for delay differential equations;

Stability analysis for θ -methods with delay differential equations;

Numerical stability of Runge-Kutta methods for delay differential equations with a variable delay;

Numerical oscillations of the θ-method for advanced delay differential equations with piecewise continuous arguments;

This paper is concerned with the dissipativity of Runge-Kutta methods for multidelay differential equations.

In this paper,we gave a sufficient condition of asymptotic stability for nonlinear multi-delays differential equations,and then,we discuss the case of many delays which depends on the base of the part work in the thesis Huang [1] and gain some same results.

In this paper,the asymptotic stability of the theoretical so lution and numerical solutions of nonlinear multi-delays differential equations (MDDEs) have been discussed.