摘要:We are describing the stable nonautonomous planar dynamic systems with complex coefficients by using the asymptotic solutions (phase functions) of the characteristic (Riccati) equation. In the case of nonautonomous dynamic systems, this approach is more accurate than the eigenvalue method. We are giving a new construction of the energy (Lyapunov) function via phase functions. Using this energy, we are proving new stability and instability theorems in terms of the characteristic function that depends on unknown phase functions. By different choices of the phase functions, we deduce stability theorems in terms of the auxiliary function of coefficients R A ( t ) , which is invariant with respect to the lower triangular transformations. We discuss some examples and compare our theorems with the previous results. MSC:34D20.
关键词:nonautonomous dynamic system ; stability ; attractivity to the origin ; asymptotic stability ; asymptotic solutions ; characteristic function ; Lyapunov function ; energy function
