Long rainbow arithmetic progressions
Abstract
Define Tk as the minimal t∈ N for which there is a rainbow arithmetic progression of length k in every equinumerous t-coloring of [tn] for all n∈ N. Jungi\'c, Licht (Fox), Mahdian, Nesetril and Radoici\'c proved that k24 Tk. We almost close the gap between the upper and lower bounds by proving that Tk k2e( k)2(1+o(1)). Conlon, Fox and Sudakov have independently shown a stronger statement that Tk=O(k2 k).
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