论文信息 - On the uniqueness of solutions of nonlinear dynamic networks and systems

On the uniqueness of solutions of nonlinear dynamic networks and systems

In this paper it will be shown that for a fairly broad class of nonlinear dynamic networks and systems, that while global passivity does not imply uniqueness, local passivity implies the uniqueness of the time domain solution. Furthermore, sufficient (and in a sense also close to the necessary) conditions will be presented ensuring the uniqueness of the solution for non-Lipshutzian systems. The mathematical conditions are given also in terms of element characteristics and network topology. The results can be generalized for networks containing multiport timevarying and nonlinear elements.

Tamás Roska

[1] I. W. Sandberg. Conditions for the causality of nonlinear operators defined on a function space , 1965 .

[2] H. Watanabe,et al. State-Variable Analysis of RLC Networks Containing Nonlinear Coupling Elements , 1969 .

[3] Leon O. Chua,et al. Graph-theoretic properties of dynamic nonlinear networks , 1976 .

[4] Jr. A. Willson,et al. Some aspects of the theory of nonlinear networks , 1973 .

[5] M.L. Liou,et al. Computer-aided analysis of electronic circuits: Algorithms and computational techniques , 1977, Proceedings of the IEEE.

[6] I. W. Sandberg,et al. Some theorems on properties of DC equations of nonlinear networks , 1969 .

[7] C. Desoer,et al. Feedback Systems: Input-Output Properties , 1975 .

[8] Felix F. Wu,et al. NONLINEAR MONOTONE NETWORKS , 1974 .

[9] D. Youla,et al. Bounded Real Scattering Matrices and the Foundations of Linear Passive Network Theory , 1959 .

[10] Leon O. Chua,et al. A theory of algebraic n-ports , 1973 .

[11] Ibrahim N. Hajj,et al. Nonlinear circuit theory: Resistive networks , 1971 .

[12] P. Hartman. Ordinary Differential Equations , 1965 .