On the Small Quasi-kernel conjecture

Abstract

An independent vertex subset S of the directed graph G is a kernel if the set of out-neighbors of S is V(G) S. An independent vertex subset Q of G is a quasi-kernel if the union of the first and second out-neighbors contains V(G) S as a subset. Deciding whether a directed graph has a kernel is an NP-hard problem. In stark contrast, each directed graph has quasi-kernel(s) and one can be found in linear time. In this article, we will survey the results on quasi-kernel and their connection with kernels. We will focus on the small quasi-kernel conjecture which states that if the graph has no vertex of zero in-degree, then there exists a quasi-kernel of size not larger than half of the order of the graph. The paper also contains new proofs and some new results as well.