On Neutral Edge Sets in Anti-Ramsey Numbers

Abstract

The anti-Ramsey number of a graph G, introduced by Erdos et al.\ in 1975, is the maximum number of colors in an edge-coloring of the complete graph Kn that avoids a rainbow copy of G. We call a subset of edges of G neutral for the anti-Ramsey number if removing them does not alter the anti-Ramsey number of G. Let k, t, and n be positive integers, and consider G = kP4 tP2. Assume S ⊂eq E(G) consists of internal edges of the P4 components in G. It is known that S is neutral when t ≥ k+1 ≥ 2 and n ≥ 8k + 2t - 4. In this paper, we identify values of k ≥ t such that, for all n in a specific subinterval of [8k + 2t - 4, ∞), S remains neutral. Since the anti-Ramsey numbers for matchings are well understood, our results provide a complete determination of the anti-Ramsey number for G under these conditions. Based on our findings, we conjecture that this neutrality may extend to the general case t ≥ 1, k ≥ 1, and n ≥ 4k + 2t, but not when t = 0, k ≥ 2, and n ≥ 4k.

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