Zoltan Furedi
Published 2012-04-09, updated 2013-05-30Version 2
Given a tree T on v vertices and an integer k exceeding one. One can define the k-expansion T^k as a k-uniform linear hypergraph by enlarging each edge with a new, distinct set of (k-2) vertices. Then T^k has v+ (v-1)(k-2) vertices. The aim of this paper is to show that using the delta-system method one can easily determine asymptotically the size of the largest T^k-free n-vertex hypergraph, i.e., the Turan number of T^k.
Comments: Slightly revised, 14 pages, originally presented on Eurocomb 2011
Fractional and integer matchings in uniform hypergraphs
Total Transversals and Total Domination in Uniform Hypergraphs
On the spectral radius of a class of non-odd-bipartite even uniform hypergraphs
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