Kernel perfect and critical kernel imperfect digraphs structure

Hortensia Galeana-Sánchez,Mucuy-Kak Guevara

doi:10.46298/dmtcs.3467

Abstract

A kernel $N$ of a digraph $D$ is an independent set of vertices of $D$ such that for every $w \in V(D)-N$ there exists an arc from $w$ to $N$. If every induced subdigraph of $D$ has a kernel, $D$ is said to be a kernel perfect digraph. Minimal non-kernel perfect digraph are called critical kernel imperfect digraph. If $F$ is a set of arcs of $D$, a semikernel modulo $F$, $S$ of $D$ is an independent set of vertices of $D$ such that for every $z \in V(D)- S$ for which there exists an $Sz-$arc of $D-F$, there also exists an $zS-$arc in $D$. In this talk some structural results concerning critical kernel imperfect and sufficient conditions for a digraph to be a critical kernel imperfect digraph are presented.

Highlights

To cite this version: Hortensia Galeana-Sánchez, Mucuy-Kak Guevara
A kernel N of a digraph D is an independent set of vertices of D such that for every w ∈ V (D) − N there exists an arc from w to N
If F is a set of arcs of D, a semikernel modulo F, S of D is an independent set of vertices of D such that for every z ∈ V (D) − S for which there exists an Sz−arc of D − F, there exists an zS−arc in D

Summary

Introduction

To cite this version: Hortensia Galeana-Sánchez, Mucuy-Kak Guevara. Kernel perfect and critical kernel imperfect digraphs structure. 2005 European Conference on Combinatorics, Graph Theory and Applications (EuroComb ’05), 2005, Berlin, Germany. pp.257-262. hal-01184456. A kernel N of a digraph D is an independent set of vertices of D such that for every w ∈ V (D) − N there exists an arc from w to N . 2. If every cycle of odd length has at least two symmetrical arcs, the digraph is kernel perfect.

Results

Conclusion