By using the Lyapunov functional method and an integral inequality, this paper analyzes the absolute stability of the neutral type Lurie control system with time delay in control input.

By using the Lyapunov functional method and an integral inequality, two delay dependent conditions for the absolute stability of the system in the Hurwitz angular domain are obtained.

It discards the traditional restriction for Lyapunov functional such that dV/dt≥0.

Weobtian four theorems of existence and uniqueness on periodic solutions and equilibrium solutions and also obtain some sufficient conditions for which every solution approaches the unique periodic solution or the unique equilibrium solution as t→+∞ by means of the methodo f Liapunov functional.

We investigate the existence of almost periodic solutions of functional differential equations of neutral type by Liapunov functional which is not positive definite.

Combined the quality of Metzler matrix with the technique of linear matrix inequalities(LMIs),the novel piecewise Lyapunov functionals are constructed,and the results which in terms of Lyapunov-Metzler LMIs were obtained.