Three Generalizations of Erdos Szekeres: k-Modal Subsequences

Abstract

Erdos and Szekeres showed that given a permutation p of [n], and the sequence defined by (p(1), p(2), …, p(n)), there exists either a decreasing or increasing subsequence, not necessarily contiguous, of length at least n. Fan Chung considered subsequences that can have at most one change of direction, i.e. an increasing and then decreasing subsequence, or a decreasing and then increasing subsequence. She called these unimodal subsequences, and showed there exists a unimodal subsequence of length at least 3n, up to some constants chung. She conjectured that a permutation of n contains a k-modal (at most k changes in direction) subsequence of length at least (2k+1)n up to some constants. Zijian Xu proved this conjecture in 2024 xu, and we will provide another substantially different proof using "sophisticated labeling arguments" instead of "underlying poset structures behind k-modal subsequences." We also show that there exists an increasing first k-modal subsequence of length at least 2kn.