(χ_(max cT)(G))=max｛k｜G has a k-total colors maximal cliques vertex-coloring }is called the total colors maximal cliques chromatic number.

If a vertex-coloring of graph G make all colors apper any maximal clique of graph G ,then the coloring is called the total colors maximal cliques vertex-coloring.

The total chromatic number of general graphs K(n,m);

Let G be a simple graph,k is a positive integer and f is a mapping form V(G)∪E(G) to {1,2,…,k},if for any uv∈E(G),there are f(u)≠f(v),f(u)≠f(uv),f(v)≠f(uv);for any uv,vw∈E(G),u≠w,there is f(uv)≠f(uw),then f is called a k-proper total coloring of G(k-TC in brief),and the number ΧT(G)=min{k|G存在k-TC} is called the total chromatic number of G.

Then the total chromatic number of G is Δ(G)+1 if(Δ,k)∈{(6,4),(5,5),(4,11)}.

The total chromatic number x1(G) is the smallest interger k such that G has a total k-coloring.

This paper has solved the open question proposed by Zhang Zhongfu and others in reference [1],which is to ascertain the attainable lower bound of x4T(G)+x4T(G) ,in which x4T(G) indicates the 4-total chromatic number of a graph G, while G indicates the complement graph of G.