On the maximum density of r-graphs in which every (r+1)-set spans 0 or 2 edges
Abstract
In 1984, Frankl and Füredi asked for the maximum density of an n-vertex r-graph in which every (r+1)-set of vertices spans 0 or 2 edges. They gave a construction with asymptotic density 21-r. We significantly improve this bound by constructing such r-graphs with density Ω(r-3), thereby improving the dependence on r from exponential to polynomial. We also obtain lower bounds for the more general problem in which every (r+1)-set spans an even number of edges from \0,2,…,2k\.
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