Supersaturation of odd linear cycles
Abstract
An r-uniform linear cycle of length , denoted by Cr, is an r-graph with edges e1,e2,…,e where ei=\v(r-1)(i-1),v(r-1)(i-1)+1,…,v(r-1)i\ (here v0=v(r-1)). For 0<δ<1 and n sufficiently large, we show that every n-vertex r-graph G with nr-δ edges contains at least n(r-1)(2+1)-δ(2+1+4-1(r-1)(2+1)-3)-o(1) copies of Cr2+1. Further, conditioning on the existence of dense high-girth hypergraphs, we show that there exists n-vertex r-graphs with nr-δ edges and at most n(r-1)(2+1)-δ(2+1+1(r-1)-1)+o(1) copies of Cr2+1.
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