A note on finding long directed cycles above the minimum degree bound in 2-connected digraphs
Abstract
For a directed graph G, let mindeg(G) be the minimum among in-degrees and out-degrees of all vertices of G. It is easy to see that G contains a directed cycle of length at least mindeg(G)+1. In this note, we show that, even if G is 2-connected, it is NP-hard to check if G contains a cycle of length at least mindeg(G)+3. This is in contrast with recent algorithmic results of Fomin, Golovach, Sagunov, and Simonov [SODA 2022] for analogous questions in undirected graphs.
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