The Second Neighborhood Conjecture for Oriented Graphs Missing \C4, C4, S3, chair and co-chair\-Free Graph
Abstract
Seymour's Second Neighborhood Conjecture (SNC) asserts that every oriented graph has a vertex whose first out-neighborhood is at most as large as its second out-neighborhood. In this paper, we prove that if G is a graph containing no induced C4, C4, S3, chair and chair, then every oriented graph missing G satisfies this conjecture. As a consequence, we deduce that the conjecture holds for every oriented graph missing a threshold graph, a generalized comb or a star.
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