DocumentCode :
1177383
Title :
Planar, coplanar, and totally planar n-port networks
Author :
Inukai, Thomas ; Weinberg, Louis
Volume :
23
Issue :
3
fYear :
1976
fDate :
3/1/1976 12:00:00 AM
Firstpage :
136
Lastpage :
141
Abstract :
The aim of this paper is to provide necessary and sufficient conditions for an 
-port network to be planar, coplanar, and totally planar. Generally, a planar graph does not have a unique plane representation, and a combinatorial problem arises in determining whether the graph is planar, coplanar, or totally planar. To avoid the combinatorial complexity the graph is decomposed into 3-connected components called atoms. Since atoms have unique sets of boundaries and coboundaries, our planarity and coplanarity conditions, which are established on atoms, may be easily examined on any plane representations of the atoms.
-port network to be planar, coplanar, and totally planar. Generally, a planar graph does not have a unique plane representation, and a combinatorial problem arises in determining whether the graph is planar, coplanar, or totally planar. To avoid the combinatorial complexity the graph is decomposed into 3-connected components called atoms. Since atoms have unique sets of boundaries and coboundaries, our planarity and coplanarity conditions, which are established on atoms, may be easily examined on any plane representations of the atoms.Keywords :
Graph theory; Graph theory and network topology; Multiport networks; Atomic measurements; Books; Cities and towns; Current measurement; Intersymbol interference; Sufficient conditions; Terminology; Voltage;
fLanguage :
English
Journal_Title :
Circuits and Systems, IEEE Transactions on
Publisher :
ieee
ISSN :
0098-4094
Type :
jour
DOI :
10.1109/TCS.1976.1084193
Filename :
1084193
Link To Document :
