A note on explicit constructions of designs

Abstract

An (n,r,s)-system is an r-uniform hypergraph on n vertices such that every pair of edges has an intersection of size less than s. Using probabilistic arguments, R\"odl and Sinajov\'a showed that for all fixed integers r> s 2, there exists an (n,r,s)-system with independence number O(n1-δ+o(1)) for some optimal constant δ >0 only related to r and s. We show that for certain pairs (r,s) with s r/2 there exists an explicit construction of an (n,r,s)-system with independence number O(n1-ε), where ε > 0 is an absolute constant only related to r and s. Previously this was known only for s>r/2 by results of Chattopadhyay and Goodman

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