The maximum sturdiness of intersecting families
Abstract
Given a family F⊂ 2[n] and 1≤ i≠ j≤ n, we use F(i,j) to denote the family \F \j\ F∈ F,\ F \i,j\=\j\\. The sturdiness of F is defined as the minimum |F(i,j)| over all i,j∈ [n] with i≠ j. It has a very natural algebraic definition as well. In the present paper, we consider the maximum sturdiness of k-uniform intersecting families, k-uniform t-intersecting families and non-uniform t-intersecting families. One of the main results shows that for n≥ 36(k+6), an intersecting family F⊂ [n]k has sturdiness at most n-4k-3, which is best possible.
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