Monochromatic Progressions in Random Colorings
Abstract
Let N+(k)= 2k/2 k3/2 f(k) and N-(k)= 2k/2 k1/2 g(k) where 1=o(f(k)) and g(k)=o(1). We show that the probability of a random 2-coloring of 1,2,...,N+(k) containing a monochromatic k-term arithmetic progression approaches 1, and the probability of a random 2-coloring of 1,2,...,N-(k) containing a monochromatic k-term arithmetic progression approaches 0, for large k. This improves an upper bound due to Brown, who had established an analogous result for N+(k)= 2k log k f(k).
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