Mohammad Shakhatreh and Ahmad Al-Rhayyel

Copyright © 2006 Mohammad Shakhatreh and Ahmad Al-Rhayyel. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

The basis number b(G) of a graph G is defined to be the least integer k such that G has a k-fold basis for its cycle space. In this note, we determine the basis number of the corona of graphs, in fact we prove that b(v∘T)=2 for any tree and any vertex v not in T, b(v∘H)≤b(H)+2, where H is any graph and v is not a vertex of H, also we prove that if G=G1∘G2 is the corona of two graphs G1 and G2, then b(G1)≤b(G)≤max⁡{b(G1),b(G2)+2}, moreover we prove that if G is a Hamiltonian graph, then b(v∘G)≤b(G)+1, where v is any vertex not in G, and finally we give a sequence of remarks which gives the basis number of the corona of some of special graphs.