Publication Date:
2007
abstract:
We consider the following conjecture:
Let G be a k-regular simple graph with an even number n of vertices. If k >= n/2 then G is k-edge-colourable.
We show that this conjecture is true for graphs that are join of two graphs and we provide a polynomial time algorithm for
finding a k-edge-colouring of these graphs.
Iris type:
01.01 Articolo in rivista
Keywords:
Edge-colouring; Regular graph; Join
List of contributors:
DE SIMONE, Caterina; Galluccio, Anna
Published in: