Title :
L(2,1)-coloring of the Fibonacci cubes
Author :
Taranenko, Andrej ; Vesel, Aleksander
Author_Institution :
Fac. of Educ., Maribor Univ.
Abstract :
An L(2, l)-coloring of a graph G is an assignment of labels from {0,1,..., A} to the vertices of G such that vertices at distance two get different labels and adjacent vertices get labels that are at least two apart. The X-number X(G) of G is the minimum value A such that G admits an L(2,1)-coloring. It is well known that the problem of determining the X-number is NP-hard. The Fibonacci cube network was recently proposed as an alternative to the hypercube network. Three different evolutionary algorithms are presented to find optimal or near optimal L(2,1)-coloring of the Fibonacci cubes. The algorithms are compared with the Petford-Welsh probabilistic algorithm
Keywords :
Fibonacci sequences; evolutionary computation; graph colouring; optimisation; Fibonacci cube network; NP-hard problem; Petford-Welsh probabilistic algorithm; evolutionary algorithm; graph coloring; hypercube network; Communication networks; Evolutionary computation; Hamming distance; Hypercubes; Network topology; Radio frequency; Radio transmitters; Routing; Tree graphs; Wireless mesh networks;
Conference_Titel :
Information Technology Interfaces, 2004. 26th International Conference on
Conference_Location :
Cavtat
Print_ISBN :
953-96769-9-1
