DocumentCode :
1180798
Title :
Nonlinear n-port decomposition via the Laplace operator
Author :
Wyatt, John L., Jr. ; Chua, Leon O. ; Oster, George F.
Volume :
25
Issue :
9
fYear :
1978
fDate :
9/1/1978 12:00:00 AM
Firstpage :
741
Lastpage :
754
Abstract :
We give a general solution to a previously open problem in the decomposition of nonlinear n-ports. Any resistive (or capacitive or inductive) 
-port can be decomposed into a particular interconnection of two simpler -ports. The first is reciprocal, and the second can be further decomposed into 
reciprocal n-ports and 
linear 
ports. The technique, which we believe is completely new to network theory, is based on certain algebraic properties of the Laplace operator. It is related to the Hodge theorem from differential geometry, applied to l-forms on Euclidean space.
-port can be decomposed into a particular interconnection of two simpler -ports. The first is reciprocal, and the second can be further decomposed into reciprocal n-ports and linear ports. The technique, which we believe is completely new to network theory, is based on certain algebraic properties of the Laplace operator. It is related to the Hodge theorem from differential geometry, applied to l-forms on Euclidean space.Keywords :
Algebraic and geometric techniques; Multiport networks; Nonlinear networks; Operator theory; Resistive networks; Vector analysis; Bridges; Control engineering; Control theory; Education; Humans; Jacobian matrices; Laplace equations; Mathematics; Matrix decomposition; Symmetric matrices;
fLanguage :
English
Journal_Title :
Circuits and Systems, IEEE Transactions on
Publisher :
ieee
ISSN :
0098-4094
Type :
jour
DOI :
10.1109/TCS.1978.1084530
Filename :
1084530
Link To Document :
