مرکز منطقه ای اطلاع رساني علوم و فناوري - Some results on existence and uniqueness of solutions of nonlinear networks

DocumentCode :

1169062

Title :

Some results on existence and uniqueness of solutions of nonlinear networks

Author :

Fujisawa, Toshio ; Kuh, Ernest S.

Volume :

Issue :

fYear :

1971

fDate :

9/1/1971 12:00:00 AM

Firstpage :

501

Lastpage :

506

Abstract :

This paper deals with nonlinear networks which can be characterized by the equation $f(x) = y$ , where $f(\\cdot)$ maps the real Euclidean $n$ -space $R^{n}$ into itself and is assumed to be continuously differentiable $x$ is a point in $R^{n}$ and represents a set of chosen network variables, and $y$ is an arbitrary point in $R^{n}$ and represents the input to the network. The authors derive sufficient conditions for the existence of a unique solution of the equation for all $y \\in R^{n}$ in terms of the Jacobian matrix $\\partial f/ \\partial x$ . It is shown that if a set of cofactors of the Jacobian matrix satisfies a "ratio condition," the network has a unique solution. The class of matrices under consideration is a generalization of the class $P$ recently introduced by Fiedler and Pták, and it includes the familiar uniformly positive-definite matrix as a special case.

Keywords :

Nonlinear network analysis & design; Nonlinear networks; Resistance networks; Circuit theory; Control engineering; Couplings; Jacobian matrices; Laboratories; Nonlinear equations; Resistors; Sufficient conditions; Tin;

fLanguage :

English

Journal_Title :

Circuit Theory, IEEE Transactions on

Publisher :

ieee

ISSN :

0018-9324

Type :

jour

DOI :

10.1109/TCT.1971.1083336

Filename :

1083336

Link To Document :

https://search.ricest.ac.ir/dl/search/defaultta.aspx?DTC=49&DC=1169062