论文信息 - Generalizations of Blakesley's Source Shift Theorem

Generalizations of Blakesley's Source Shift Theorem

Abstract. It is shown that the well-known Voltage Source Shift Theorem due to Blakesley and its dual version, the Current Source Shift Theorem as well as the rules for the transformation of networks with loops of capacitors or cut sets of inductors into networks without such loops or cutsets, resp., and the relationships between capacitance coefficients and partial capacitors are special cases of general theorems on the terminal behavior of networks. The proof of these theorems is based on the theory of terminal behavior of networks. For these proofs we do not need the substitution theorem with its strong uniqueness assumptions. This fact is an essential advantage in comparison to the original proof given by Chua and Green.

A. Reibiger | A. Reibiger

[1] A. Reibiger,et al. Bond graphs and matroids , 2000 .

[2] A. Reibiger. Auxiliary branch method and modified nodal voltage equations , 2008 .

[3] A. Reibiger. Über das Klemmenverhalten von Netzwerken , 1986 .

[4] M. N. Shanmukha Swamy,et al. Graphs: Theory and Algorithms , 1992 .

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

[6] Thomas H Blakesley,et al. A new Electrical Theorem , 2022 .

[7] J. Willems. Paradigms and puzzles in the theory of dynamical systems , 1991 .

[8] Leon O. Chua,et al. Linear and nonlinear circuits , 1987 .

[9] S. A. Meguid,et al. Computer-Aided Analysis , 1987 .

[10] Charles A. Desoer,et al. Basic Circuit Theory , 1969 .

[11] Leon O. Chua,et al. Computer-Aided Analysis Of Electronic Circuits , 1975 .

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

[13] Jan C. Willems,et al. Introduction to mathematical systems theory: a behavioral approach, Texts in Applied Mathematics 26 , 1999 .

[14] Pascal Leuchtmann. Einführung in die elektromagnetische Feldtheorie , 2005 .

[15] E. Hairer,et al. Solving Ordinary Differential Equations II: Stiff and Differential-Algebraic Problems , 2010 .

[16] Wolfgang Mathis,et al. Mathematical foundations of the TC-method for computing multiple DC-operating points , 2003 .