论文信息 - A generalization of Brayton-Moser's mixed potential function

A generalization of Brayton-Moser's mixed potential function

In this paper we give algorithms for constructing the Brayton-Moser's mixed potential function for a class of nonlinear reciprocal RLC networks, and we state necessary conditions for their existence. We have attempted to find the largest possible class of networks for which such a scalar function of state variables consisting of capacitor voltages and inductor currents can be constructed explicitly. Our results are applicable to a certain subclass of complete networks. From a mathematical point of view, we show that the corresponding network equations belong to the class of index I systems.

L. Trajković | W. Mathis | L. Weiss

[1] J. K. Moser. Bistable Systems of Differential Equations with Applications to Tunnel Diode Circuits , 1961, IBM J. Res. Dev..

[2] J. K. Moser,et al. A theory of nonlinear networks. I , 1964 .

[3] J. O. Flower. The existence of the mixed potential function , 1968 .

[4] J. O. Flower. The topology of the mixed potential function , 1968 .

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

[6] L. Chua. Stationary principles and potential functions for nonlinear networks , 1973 .

[7] E.-H. Horneber,et al. Application of the mixed potential for formulating normal form equations for nonlinear rlc‐networks with ideal transformers , 1978 .

[8] Leon O. Chua,et al. Nonlinear circuit theory , 1978 .

[9] W Kampowsky,et al. CLASSIFICATION AND NUMERICAL SIMULATION OF ELECTRIC CIRCUITS , 1992 .

[10] Leon O. Chua,et al. On the geometrical meaning of pseudo hybrid content and mixed potential , 1992 .

[11] Wolfgang Mathis,et al. A thermodynamical approach to noise in non-linear networks , 1998, Int. J. Circuit Theory Appl..

[12] Wolfgang Mathis,et al. A thermodynamical approach to noise in non-linear networks , 1998 .