Weak-odd chromatic index of special digraph classes

Abstract

Give a digraph D=(V(D),A(D)), let ∂+D(v)=\vw|w∈ N+D(v)\ and ∂-D(v)=\uv|u∈ N-D(v)\ be semi-cuts of v. A mapping :A(D)→ [k] is called a weak-odd k-edge coloring of D if it satisfies the condition: for each v∈ V(D), there is at least one color with an odd number of occurrences on each non-empty semi-cut of v. We call the minimum integer k the weak-odd chromatic index of D. When limit to 2 colors, use def(D) to denote the defect of D, the minimum number of vertices in D at which the above condition is not satisfied. In this paper, we give a descriptive characterization about the weak-odd chromatic index and the defect of semicomplete digraphs and extended tournaments, which generalize results of tournaments to broader classes. And we initiated the study of weak-odd edge covering on digraphs.