English

Locally Convex Words and Permutations

Combinatorics 2015-07-08 v2

Abstract

We introduce some new classes of words and permutations characterized by the second difference condition π(i1)+π(i+1)2π(i)k\pi(i-1) + \pi(i+1) - 2\pi(i) \leq k, which we call the kk-convexity condition. We demonstrate that for any sized alphabet and convexity parameter kk, we may find a generating function which counts kk-convex words of length nn. We also determine a formula for the number of 0-convex words on any fixed-size alphabet for sufficiently large nn by exhibiting a connection to integer partitions. For permutations, we give an explicit solution in the case k=0k = 0 and show that the number of 1-convex and 2-convex permutations of length nn are Θ(C1n)\Theta(C_1^n) and Θ(C2n)\Theta(C_2^n), respectively, and use the transfer matrix method to give tight bounds on the constants C1C_1 and C2C_2. We also providing generating functions similar to the the continued fraction generating functions studied by Odlyzko and Wilf in the "coins in a fountain" problem.

Keywords

Cite

@article{arxiv.1410.7818,
  title  = {Locally Convex Words and Permutations},
  author = {Christopher Coscia and Jonathan DeWitt},
  journal= {arXiv preprint arXiv:1410.7818},
  year   = {2015}
}

Comments

20 pages, 4 figures

R2 v1 2026-06-22T06:39:31.056Z