Sequences of formation width 4 and alternation length 5

Abstract

Sequence pattern avoidance is a central topic in combinatorics. A sequence s contains a sequence u if some subsequence of s can be changed into u by a one-to-one renaming of its letters. If s does not contain u, then s avoids u. A widely studied extremal function related to pattern avoidance is Ex(u, n), the maximum length of an n-letter sequence that avoids u and has every r consecutive letters pairwise distinct, where r is the number of distinct letters in u. We bound Ex(u, n) using the formation width function, fw(u), which is the minimum s for which there exists r such that any concatenation of s permutations, each on the same r letters, contains u. In particular, we identify every sequence u such that fw(u)=4 and u contains ababa. The significance of this result lies in its implication that, for every such sequence u, we have Ex(u, n) = (n α(n)), where α(n) denotes the incredibly slow-growing inverse Ackermann function. We have thus identified the extremal function of many infinite classes of previously unidentified sequences.