Three Results on Generalized Quasikernels in Digraphs
Abstract
A q-kernel of a digraph D is an independent set Q⊂eq D such that every vertex of D is reachable from Q by a directed path of length at most q, which is a natural generalization of kernels and quasikernels. In this paper, we establish three results on generalized quasikernels. Firstly, we prove that any n-vertex source-free bipartite oriented graph with no directed 4-cycles has a quasikernel of size at most 17n/35. Secondly, we show that every digraph with no (r-1)-source set contains r pairwise disjoint (3r-2)-kernels, where r 2. At last, we consider unicyclic digraph with a directed cycle of length 2 and bipartition U V, and we prove that for every odd integer q 3, there exist two q-kernels QU⊂eq U and QV⊂eq V such that \[ |QU|+|QV| 2· /(q+1) |V(D)|. \] These results confirm two conjectures and give an affirmative answer to a question posed by Spiro in European Journal of Combinatorics 133 (2026), 104307.
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