About the second neighborhood conjecture for tournaments missing two stars or disjoint paths
DOI:
https://doi.org/10.55016/ojs/cdm.v20i2.77499Abstract
Seymour's Second Neighborhood Conjecture (SSNC) asserts that every oriented finite simple graph (without digons) has a vertex whose second out-neighborhood is at least as large as its first out-neighborhood. Such a vertex is said to have the second neighborhood property (SNP). In this paper, we prove SSNC for tournaments missing two stars. We also study SSNC for tournaments missing disjoint paths and, particularly, in the case of missing paths of length 2. In some cases, we exhibit at least two vertices with the SNP.
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Copyright (c) 2025 Moussa Daamouch, Salman Ghazal, Darine Al-Mniny
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