English

Bounding sequence extremal functions with formations

Discrete Mathematics 2014-11-14 v3 Combinatorics

Abstract

An (r,s)(r, s)-formation is a concatenation of ss permutations of rr letters. If uu is a sequence with rr distinct letters, then let Ex(u,n)\mathit{Ex}(u, n) be the maximum length of any rr-sparse sequence with nn distinct letters which has no subsequence isomorphic to uu. For every sequence uu define fw(u)\mathit{fw}(u), the formation width of uu, to be the minimum ss for which there exists rr such that there is a subsequence isomorphic to uu in every (r,s)(r, s)-formation. We use fw(u)\mathit{fw}(u) to prove upper bounds on Ex(u,n)\mathit{Ex}(u, n) for sequences uu such that uu contains an alternation with the same formation width as uu. We generalize Nivasch's bounds on Ex((ab)t,n)\mathit{Ex}((ab)^{t}, n) by showing that fw((12l)t)=2t1\mathit{fw}((12 \ldots l)^{t})=2t-1 and Ex((12l)t,n)=n21(t2)!α(n)t2±O(α(n)t3)\mathit{Ex}((12\ldots l)^{t}, n) =n2^{\frac{1}{(t-2)!}\alpha(n)^{t-2}\pm O(\alpha(n)^{t-3})} for every l2l \geq 2 and t3t\geq 3, such that α(n)\alpha(n) denotes the inverse Ackermann function. Upper bounds on Ex((12l)t,n)\mathit{Ex}((12 \ldots l)^{t} , n) have been used in other papers to bound the maximum number of edges in kk-quasiplanar graphs on nn vertices with no pair of edges intersecting in more than O(1)O(1) points. If uu is any sequence of the form avavaa v a v' a such that aa is a letter, vv is a nonempty sequence excluding aa with no repeated letters and vv' is obtained from vv by only moving the first letter of vv to another place in vv, then we show that fw(u)=4\mathit{fw}(u)=4 and Ex(u,n)=Θ(nα(n))\mathit{Ex}(u, n) =\Theta(n\alpha(n)). Furthermore we prove that fw(abc(acb)t)=2t+1\mathit{fw}(abc(acb)^{t})=2t+1 and Ex(abc(acb)t,n)=n21(t1)!α(n)t1±O(α(n)t2)\mathit{Ex}(abc(acb)^{t}, n) = n2^{\frac{1}{(t-1)!}\alpha(n)^{t-1}\pm O(\alpha(n)^{t-2})} for every t2t\geq 2.

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

R2 v1 2026-06-22T01:10:54.771Z