Decomposing the Complete r-Graph
Abstract
Let fr(n) be the minimum number of complete r-partite r-graphs needed to partition the edge set of the complete r-uniform hypergraph on n vertices. Graham and Pollak showed that f2(n) = n-1. An easy construction shows that fr(n) (1-o(1))n r/2 and it has been unknown if this upper bound is asymptotically sharp. In this paper we show that fr(n) (1415+o(1))nr/2 for each even r 4.
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