Three-color van der Waerden numbers grow super-exponentially
Abstract
For k sufficiently large, we show that there is a three-coloring of the first 2k (* k)/4 positive integers without any monochromatic k-term arithmetic progressions. Thus, the three-color van der Waerden number w(k;3) grows faster than any exponential in k. We further prove a new lower bound on multicolor van der Waerden numbers which resolves a problem of Erdős and Graham on canonical van der Waerden numbers.
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