Improved Bounds for the Graham-Pollak Problem for Hypergraphs

Abstract

For a fixed r, let fr(n) denote the minimum number of complete r-partite r-graphs needed to partition the complete r-graph on n vertices. The Graham-Pollak theorem asserts that f2(n)=n-1. An easy construction shows that fr(n) ≤ (1+o(1))n r/2 , and we write cr for the least number such that fr(n) ≤ cr (1+o(1))n r/2 . It was known that cr < 1 for each even r ≥ 4, but this was not known for any odd value of r. In this short note, we prove that c295<1. Our method also shows that cr → 0, answering another open problem.