Split-Twin Extensions Preserving Seymour Vertices

Abstract

The Second Neighborhood Conjecture of Seymour asserts that every oriented graph contains a vertex~v satisfying |(v)||(v)|. We introduce Pisa graphs -- strongly connected oriented graphs~D with Δ(D)=v∈ V(D)(|(v)|-|(v)|)=0 -- named after the Leaning Tower of Pisa, as these graphs stand at the precise boundary between satisfying and potentially violating the conjecture. We prove that a Pisa graph containing a vertex of outdegree one must have underlying graph~Cn. We verify computationally that every Pisa graph on at most seven vertices has underlying graph isomorphic to either~Cn or~Kn minus a matching, and conjecture this holds in general. Partial structural results are presented, including a decomposition formula for the sum of all vertex margins, and a connection to blowup constructions for potential counterexamples due to Zelenskyi, Darmosiuk and Nalivayko.