English

On Three Sets with Nondecreasing Diameter

Combinatorics 2014-07-22 v1

Abstract

Let [a,b][a,b] denote the integers between aa and bb inclusive and, for a finite subset XZX \subseteq \mathbb{Z}, let the diameter of XX be equal to max(X)min(X)\max(X)-\min(X). We write X<pYX<_p\,Y provided max(X)<min(Y)\max(X)<\min(Y). For a positive integer mm, let f(m,m,m;2)f(m,m,m;2) be the least integer NN such that any 22-coloring Δ:[1,N]{0,1}\Delta: [1, N]\rightarrow \{0,1\} has three monochromatic mm-sets B1,B2,B3[1,N]B_1, B_2, B_3 \subseteq [1,N] (not necessarily of the same color) with B1<pB2<pB3B_1<_p\, B_2 <_p\, B_3 and diam(B1)diam(B2)diam(B3)diam(B_1)\leq diam(B_2)\leq diam(B_3). Improving upon upper and lower bounds of Bialostocki, Erd\H os and Lefmann, we show that f(m,m,m;2)=8m5+2m23+δf(m,m,m;2)=8m-5+\lfloor\frac{2m-2}{3}\rfloor+\delta for m2m\geq 2, where δ=1\delta=1 if m{2,5}m\in \{2,5\} and δ=0\delta=0 otherwise.

Keywords

Cite

@article{arxiv.1407.5122,
  title  = {On Three Sets with Nondecreasing Diameter},
  author = {Daniel Bernstein and David J. Grynkiewicz and Carl R. Yerger},
  journal= {arXiv preprint arXiv:1407.5122},
  year   = {2014}
}

Comments

24 pages

R2 v1 2026-06-22T05:07:53.143Z