Constructing sparse Davenport-Schinzel sequences

Abstract

For any sequence u, the extremal function Ex(u, j, n) is the maximum possible length of a j-sparse sequence with n distinct letters that avoids u. We prove that if u is an alternating sequence a b a b … of length s, then Ex(u, j, n) = (s n2) for all j ≥ 2 and s ≥ n, answering a question of Wellman and Pettie [Lower Bounds on Davenport-Schinzel Sequences via Rectangular Zarankiewicz Matrices, Disc. Math. 341 (2018), 1987--1993] and extending the result of Roselle and Stanton that Ex(u, 2, n) = (s n2) for any alternation u of length s ≥ n [Some properties of Davenport-Schinzel sequences, Acta Arithmetica 17 (1971), 355--362]. Wellman and Pettie also asked how large must s(n) be for there to exist n-block DS(n, s(n)) sequences of length (n2-o(1)). We answer this question by showing that the maximum possible length of an n-block DS(n, s(n)) sequence is (n2-o(1)) if and only if s(n) = (n1-o(1)). We also show related results for extremal functions of forbidden 0-1 matrices with any constant number of rows and extremal functions of forbidden sequences with any constant number of distinct letters.