Title :
The undirected de Bruijn graph: fault tolerance and routing algorithms
Author_Institution :
Dept. of Electr. Eng., South Carolina Univ., Columbia, SC, USA
fDate :
1/1/1992 12:00:00 AM
Abstract :
The undirected version of the de Bruijn graph, also called the shift-and-replace graph, has N=kn vertices, maximum degree k, and minimum degree k-2. A.H. Esfahanian and S.L. Hakimi (1985) have shown that this graph has diameter n=logkN, connectivity 2k-2, and has an increase in diameter of at most logkn+4 in the presence of up to 2k-3 fault vertices. The author tightens this bound significantly. It is shown that the increase in the diameter of this graph is at most logklog φn+6+logk5, where φ is the golden ratio. The methods used draw upon the theory of string overlaps and the theory of finite automata
Keywords :
graph theory; network topology; connectivity; diameter; fault tolerance; finite automata; golden ratio; routing algorithms; shift-and-replace graph; string overlaps; undirected de Bruijn graph; vertices; Circuit faults; Circuit simulation; Computational modeling; Delay; Design automation; Fault tolerance; Inverters; Routing; Semiconductor device modeling; Switching circuits;
Journal_Title :
Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on
