Vizing's and Shannon's Theorems for defective edge colouring

Abstract

We call a multigraph (k,d)-edge colourable if its edge set can be partitioned into k subgraphs of maximum degree at most d and denote as 'd(G) the minimum k such that G is (k,d)-edge colourable. We prove that for every integer d, every multigraph G with maximum degree is ( d , d)-edge colourable if d is even and ( 3 - 13d - 1 , d)-edge colourable if d is odd and these bounds are tight. We also prove that for every simple graph G, 'd(G) ∈ \ d , +1d \ and characterize the values of d and for which it is NP-complete to compute 'd(G). These results generalize several classic results on the chromatic index of a graph by Shannon, Vizing, Holyer, Leven and Galil.