Independence number of edge-chromatic critical graphs

Abstract

Let G be a simple graph with maximum degree (G) and chromatic index '(G). A classic result of Vizing indicates that either '(G )=(G) or '(G )=(G)+1. The graph G is called -critical if G is connected, '(G )=(G)+1 and for any e∈ E(G), '(G-e)=(G). Let G be an n-vertex -critical graph. Vizing conjectured that α(G), the independence number of G, is at most n2. The current best result on this conjecture, shown by Woodall, is that α(G)<3n5. We show that for any given ∈ (0,1), there exist positive constants d0() and D0() such that if G is an n-vertex -critical graph with minimum degree at least d0 and maximum degree at least D0, then α(G)<(12+)n. In particular, we show that if G is an n-vertex -critical graph with minimum degree at least d and (G) (d+2)5d+10, then \[ α(G) < . cases 7n12, & if d= 3; 4n7, & if d= 4; d+2+[3](d-1)d2d+4+[3](d-1)dn<4n7, & if d 19. cases . \]