On the size of special class 1 graphs and (P3; k)-co-critical graphs

Abstract

A well-known theorem of Vizing states that if G is a simple graph with maximum degree , then the chromatic index '(G) of G is or +1. A graph G is class 1 if '(G)=, and class 2 if '(G)=+1; G is -critical if it is connected, class 2 and '(G-e)<'(G) for every e∈ E(G). A long-standing conjecture of Vizing from 1968 states that every -critical graph on n vertices has at least (n(-1)+ 3)/2 edges. We initiate the study of determining the minimum number of edges of class 1 graphs G, in addition, '(G+e)='(G)+1 for every e∈ E(G). Such graphs have intimate relation to (P3; k)-co-critical graphs, where a non-complete graph G is (P3; k)-co-critical if there exists a k-coloring of E(G) such that G does not contain a monochromatic copy of P3 but every k-coloring of E(G+e) contains a monochromatic copy of P3 for every e∈ E(G). We use the bound on the size of the aforementioned class 1 graphs to study the minimum number of edges over all (P3; k)-co-critical graphs. We prove that if G is a (P3; k)-co-critical graph on n k+2 vertices, then \[e(G) k 2(n- k 2 - ) + k/2 + 2,\] where is the remainder of n- k/2 when divided by 2. This bound is best possible for all k 1 and n 3k /2 +2.