A Generalization of the Bollobás Set Pairs Inequality

Abstract: The Bollobás set pairs inequality is a fundamental result in extremal set theory with many applications. In this paper, for $n \geqslant k \geqslant t \geqslant 2$, we consider a collection of $k$ families $\mathcal{A}_i: 1 \leq i \leqslant k$ where $\mathcal{A}_i = \{ A_{i,j} \subset [n] : j \in [n] \}$ so that $A_{1, i_1} \cap \cdots \cap A_{k,i_k} \neq \varnothing$ if and only if there are at least $t$ distinct indices $i_1,i_2,\dots,i_k$. Via a natural connection to a hypergraph covering problem, we give b… Show more

“…Although the asymptotics of the largest Bollobás (3, 3)-tuple 1 and the largest Bollobás (4, 3)-tuple 1 are wide open (see [12]), in the modulo 2 setting we are able to show:…”

A note on $k$-wise oddtown problems

“…Although the asymptotics of the largest Bollobás (3, 3)-tuple 1 and the largest Bollobás (4, 3)-tuple 1 are wide open (see [12]), in the modulo 2 setting we are able to show:…”

A note on $k$-wise oddtown problems

A Note on k-Wise Oddtown Problems

Weakly saturated hypergraphs and a conjecture of Tuza