Toward a Hajnal-Szemeredi theorem for hypergraphs
Abstract
Let H be a triple system with maximum degree d>1 and let r>107d2d. Then H has a proper vertex coloring with r colors such that any two color classes differ in size by at most one. The bound on r is sharp in order of magnitude apart from the logarithmic factors. Moreover, such an r-coloring can be found via a randomized algorithm whose expected running time is polynomial in the number of vertices of . This is the first result in the direction of generalizing the Hajnal-Szemer\'edi theorem to hypergraphs.
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