DocumentCode
2232493
Title
Bisection widths of transposition graphs
Author
Stacho, L. ; Vrt´o, I.
Author_Institution
Inst. for Inf., Slovak Acad. of Sci., Bratislava, Slovakia
fYear
1995
fDate
25-28 Oct 1995
Firstpage
681
Lastpage
688
Abstract
We prove lower and upper bounds on bisection widths of the transposition graphs. This class of graphs contains several frequently studied interconnection networks including star graphs and hypercubes. In particular, we prove that the bisection width of the complete transposition graph is of order Θ(n.n!!) which solves the open problem (R) 3.356 of F.T. Leighton (1992) and determine nearly exact value of bisection width of the star graph. The results have applications to VLSI layouts, cutwidths and crossing numbers of transposition graphs. We also study bandwidths of transposition graphs
Keywords
hypercube networks; VLSI layouts; bisection widths; cutwidths; hypercubes; interconnection networks; lower bounds; star graphs; transposition graphs; upper bounds; Bandwidth; Computer networks; Concurrent computing; Hypercubes; Informatics; Multiprocessor interconnection networks; Tree graphs; Upper bound; Very large scale integration;
fLanguage
English
Publisher
ieee
Conference_Titel
Parallel and Distributed Processing, 1995. Proceedings. Seventh IEEE Symposium on
Conference_Location
San Antonio, TX
ISSN
1063-6374
Print_ISBN
0-81867195-5
Type
conf
DOI
10.1109/SPDP.1995.530748
Filename
530748
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