Independent Sets in Hypergraphs
Abstract
A theorem of Shearer states that every n-vertex triangle-free graph of maximum degree d ≥ 2 contains an independent set of size at least (d d - d + 1)/(d - 1)2 · n. Ajtai, Koml\'os, Pintz, Spencer and Szemer\'edi proved that every (r + 1)-uniform n-vertex ``uncrowded'' hypergraph of maximum degree d ≥ 1 has an independent set of size at least cr( d)1/r/d1/r · n for some cr > 0 depending only on r. Shearer asked whether his method for triangle-free graphs could be extended to uniform hypergraphs. In this paper, we answer this in the affirmative, thereby giving a short proof of the theorem of Ajtai, Koml\'os, Pintz, Spencer and Szemer\'edi for a wider class of ``locally sparse'' hypergraphs.
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