DocumentCode :
1164063
Title :
The Algebra of Sets of Trees, k-Trees, and Other Configurations
Author :
Berger, Israel ; Nathan, Amos
Volume :
15
Issue :
3
fYear :
1968
fDate :
9/1/1968 12:00:00 AM
Firstpage :
221
Lastpage :
228
Abstract :
In linear graphs a commutative ring (Wang algebra) yields relations between sets of partial graphs such as trees, 
-trees, cut sets, circuits, and paths. This algebra is defined, explored, and applied, resulting in a unified approach by which theorems long connected with Wang algebra are rederived and new theorems are obtained. Some scattered relations, previously found by the method of "derivatives," appear as natural and special results. Special stress is put on the generation of sets of partial graphs in graphs compounded by interconnecting disjoint graphs, or by methods of cutting up the given graph. Many new theorems are derived which simplify computations by splitting a given problem into several of smaller dimension.
-trees, cut sets, circuits, and paths. This algebra is defined, explored, and applied, resulting in a unified approach by which theorems long connected with Wang algebra are rederived and new theorems are obtained. Some scattered relations, previously found by the method of "derivatives," appear as natural and special results. Special stress is put on the generation of sets of partial graphs in graphs compounded by interconnecting disjoint graphs, or by methods of cutting up the given graph. Many new theorems are derived which simplify computations by splitting a given problem into several of smaller dimension.Keywords :
Graph theory; Trees; Wang algebra; Algebra; Computer networks; History; Integrated circuit interconnections; Modules (abstract algebra); Production; Scattering; Tree graphs;
fLanguage :
English
Journal_Title :
Circuit Theory, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9324
Type :
jour
DOI :
10.1109/TCT.1968.1082816
Filename :
1082816
Link To Document :
