On Link-irregular Digraphs
Abstract
We extend the study of link-irregular graphs to directed graphs (digraphs), where a digraph is link-irregular if no two vertices have isomorphic directed links. We establish that link-irregular digraphs exist on n vertices if and only if n ≥ 5, and prove that their underlying graphs must contain 3-cycles. We conjecture that link-irregular tournaments exist if and only if n ≥ 6, providing explicit constructions for n ≤ 8 and computational verification for n ≤ 100. We derive lower bounds on the minimum degree and outdegree required for link-irregularity, establish that almost all link-irregular digraphs are nonplanar, and prove that any link-irregular orientable graph admits a link-irregular labeling. Additionally, we construct explicit examples of link-irregular digraphs with constant outdegree and regular tournaments.
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