S. Bowser and C. Cable, “At Least Three Minimal Quasi-Kernels,” Discrete Applied Mathematics, Vol. 160, No. 4-5, 2012, pp. 673-675. doi:10.1016/j.dam.2011.08.017
has been cited by the following article:
TITLE: Quasi-Kernels for Oriented Paths and Cycles
AUTHORS: Stephen Bowser, Charles Cable
KEYWORDS: Digraph; Quasi-Kernel; Path; Cycle
JOURNAL NAME: Open Journal of Discrete Mathematics, Vol.2 No.2, April 27, 2012
ABSTRACT: If D is a digraph, then K∈V(D) is a quasi-kernel of D if D[K]is discrete and for each y∈V(D)-K there is x∈K such that the directed distance from y to x is less than three. We give formulae for the number of quasi-kernels and for the number of minimal quasi-kernels of oriented paths and cycles.