Title :
Fault-Tolerant Cycle Embedding in Cartesian Product Graphs: Edge-Pancyclicity and Edge-Bipancyclicity with Faulty Edges
Author :
Chia-Wen Cheng ; Sun-Yuan Hsieh
Author_Institution :
Dept. of Comput. Sci. & Inf. Eng., Nat. Cheng Kung Univ., Tainan, Taiwan
Abstract :
A graph G is called k-edge-fault edge-bipancyclic (k-edge-fault edge-r-pancyclic) if after deleting k edges from G, every edge in the resulting graph lies in a cycle of every even length from 4 to IV (G)I (a cycle of every length from r to IV(G)I), inclusively. In this paper, given two graphs G and H, which satisfy some specific properties, the edge-fault edge-bipancyclicity and edge-fault edge-r-pancyclicity (r is decided on the properties of G and H) of Cartesian product graphs G x Hare efficiently evaluated. The obtained results are applied to two multiprocessor systems, the nearest neighbor mesh hypercubes and generalized hypercubes, both of which belong to Cartesian product graphs.
Keywords :
graph theory; parallel processing; software fault tolerance; Cartesian product graph; distributed computing; edge-fault edge-bipancyclicity; edge-fault edge-r-pancyclicity; fault-tolerant cycle; multiprocessor system; parallel computing; Algorithm design and analysis; Bridges; Educational institutions; Fault tolerance; Fault tolerant systems; Hypercubes; Network topology; Cartesian product graphs; edge-bipancyclic; edge-pancyclic; fault-tolerant embedding; graph theoretical interconnection networks;
Journal_Title :
Parallel and Distributed Systems, IEEE Transactions on
DOI :
10.1109/TPDS.2014.2364604
