English

Bounds for the Graham-Pollak Theorem for Hypergraphs

Combinatorics 2017-12-21 v2

Abstract

Let fr(n)f_r(n) represent the minimum number of complete rr-partite rr-graphs required to partition the edge set of the complete rr-uniform hypergraph on nn vertices. The Graham-Pollak theorem states that f2(n)=n1f_2(n)=n-1. An upper bound of (1+o(1))(nr2)(1+o(1)){n \choose \lfloor{\frac{r}{2}}\rfloor} was known. Recently this was improved to 1415(1+o(1))(nr2)\frac{14}{15}(1+o(1)){n \choose \lfloor{\frac{r}{2}}\rfloor} for even r4r \geq 4. A bound of [r2(1415)r4+o(1)](1+o(1))(nr2)\bigg[\frac{r}{2}(\frac{14}{15})^{\frac{r}{4}}+o(1)\bigg](1+o(1)){n \choose \lfloor{\frac{r}{2}}\rfloor} was also proved recently. The smallest odd rr for which cr<1c_r < 1 that was known was for r=295r=295. In this note we improve this to c113<1c_{113}<1 and also give better upper bounds for fr(n)f_r(n), for small values of even rr.

Keywords

Cite

@article{arxiv.1712.06403,
  title  = {Bounds for the Graham-Pollak Theorem for Hypergraphs},
  author = {Anand Babu and Sundar Vishwanathan},
  journal= {arXiv preprint arXiv:1712.06403},
  year   = {2017}
}

Comments

8 pages

R2 v1 2026-06-22T23:21:34.229Z