On k-modal subsequences
Abstract
A k-modal sequence is a sequence of real numbers that can be partitioned into k+1 (possibly empty) monotone sections such that adjacent sections have opposite monotonicities. For every positive integer k, we prove that any sequence of n pairwise distinct real numbers contains a k-modal subsequence of length at least (2k+1)(n-14) - k2, which is tight in a strong sense. This confirms an old conjecture of F.R.K.Chung (J.Combin.Theory Ser.A, 29(3):267-279, 1980).
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