Intersecting families with full difference sets

Abstract

For a family F of subsets of a finite set, define D(F)=\F F': F, F'∈F\. A family F is called intersecting if F F'= for all F, F'∈F. Frankl Frankl showed that for a k-uniform intersecting family F⊂[n] k with n k(k+3), |D(F)| reaches the maximum if and only if F is a k-uniform full star. Later, Frankl-Kiselev-Kupavskii FKK improved the bound n k(k+3) in the above result of Frankl Frankl to n 50klnk for k 50. For 2k<n<4k, Frankl-Kiselev-Kupavskii FKK showed that there exists a k-uniform family F⊂[n] k such that |D(F)| is larger than |D(S)|, where S is a full star. This result left the case n=2k open and we show that D(F) can be `full' for some F⊂[n] k. It is clear that for an intersecting family F⊂[n] k, D(F)⊂eq j=0k-1[n] j. We say that a k-uniform intersecting family F⊂[n] k has full differences if D(F)=j=0k-1[n] j. For odd k, Frankl Frankl gave a k-uniform intersecting family F⊂[2k] k having full differences of size k-1, and he asked for even k 4 whether there exists a k-uniform intersecting family F⊂[2k] k having full differences of size k-1. We answer this question in a stronger form and show that for even k 4, there exists a k-uniform intersecting family F⊂[2k] k having full differences.

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