The Hajnal--Rothschild problem
Abstract
For a family F define ( F,t) as the largest s for which there exist A1,…, As∈ F such that for i j we have |Ai Aj|< t. What is the largest family F⊂[n] k with ( F,t) s? This question goes back to a paper Hajnal and Rothschild from 1973. We show that, for some absolute C and n>2k+Ct4/5s1/5(k-t)24n, n>2k+Cs(k-t)24 n the largest family with ( F,t) s has the following structure: there are sets X1,…, Xs of sizes t+2x1,…, t+2xs, such that for any A∈ F there is i∈ [s] such that |A Xi| t+xi. That is, the extremal constructions are unions of the extremal constructions in the Complete t-Intersection Theorem. For the proof, we enhance the spread approximation technique of Zakharov and the second author. In particular, we introduce the idea of iterative spread approximation.
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