A Result on the Small Quasi-Kernel Conjecture
Abstract
Any directed graph D=(V(D),A(D)) in this work is assumed to be finite and without self-loops. A source in a directed graph is a vertex having at least one ingoing arc. A quasi-kernel Q⊂eq V(D) is an independent set in D such that every vertex in V(D) can be reached in at most two steps from a vertex in Q. It is an open problem whether every source-free directed graph has a quasi-kernel of size at most |V(D)|/2, a problem known as the small quasi-kernel conjecture (SQKC). The aim of this paper is to prove the SQKC under the assumption of a structural property of directed graphs. This relates the SQKC to the existence of a vertex u∈ V(D) and a bound on the number of new sources emerging when u and its out-neighborhood are removed from D. The results in this work are of technical nature and therefore additionally verified by means of the Coq proof-assistant.
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