Erdos-Gy\'arf\'as Conjecture for P10-free Graphs
Abstract
Let P10 be a path on 10 vertices. A graph is said to be P10-free if it does not contain P10 as an induced subgraph. The well-known Erdos-Gy\'arf\'as Conjecture states that every graph with minimum degree at least three has a cycle whose length is a power of 2. In this paper, we show that every P10-free graph with minimum degree at least three contains a cycle of length 4 or 8. This implies that the conjecture is true for P10-free graphs.
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