Rainbow cycles in properly edge-colored graphs
Abstract
We prove that every properly edge-colored n-vertex graph with average degree at least 100( n)2 contains a rainbow cycle, improving upon ( n)2+o(1) bound due to Tomon. We also prove that every properly colored n-vertex graph with at least 105 k2 n1+1/k edges contains a rainbow 2k-cycle, which improves the previous bound 2ck2n1+1/k obtained by Janzer. Our method using homomorphism inequalities and a lopsided regularization lemma also provides a simple way to prove the Erdos--Simonovits supersaturation theorem for even cycles, which may be of independent interest.
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