Bounding sequence extremal functions with formations
Abstract
An -formation is a concatenation of permutations of letters. If is a sequence with distinct letters, then let be the maximum length of any -sparse sequence with distinct letters which has no subsequence isomorphic to . For every sequence define , the formation width of , to be the minimum for which there exists such that there is a subsequence isomorphic to in every -formation. We use to prove upper bounds on for sequences such that contains an alternation with the same formation width as . We generalize Nivasch's bounds on by showing that and for every and , such that denotes the inverse Ackermann function. Upper bounds on have been used in other papers to bound the maximum number of edges in -quasiplanar graphs on vertices with no pair of edges intersecting in more than points. If is any sequence of the form such that is a letter, is a nonempty sequence excluding with no repeated letters and is obtained from by only moving the first letter of to another place in , then we show that and . Furthermore we prove that and for every .
Cite
@article{arxiv.1308.3810,
title = {Bounding sequence extremal functions with formations},
author = {J. T. Geneson and Rohil Prasad and Jonathan Tidor},
journal= {arXiv preprint arXiv:1308.3810},
year = {2014}
}
Comments
25 pages