A Generalisation of a Result on Monotone Arithmetic Progressions in Permutations of the Positive Integers
Abstract
A permutation of the positive integers avoiding monotone arithmetic progressions of length 4 with odd common difference was constructed in (LeSaulnier and Vijay, 2011). We generalise this result and show that for each k≥ 1, there exists a permutation of the positive integers that avoids monotone arithmetic progressions of length 4 with common difference not divisible by 2k.
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