Intersection patterns of planar sets

Abstract

Let A=\A1,…,An\ be a family of sets in the plane. For 0 ≤ i < n, denote by fi the number of subsets σ of \1,…,n\ of cardinality i+1 that satisfy i ∈ σ Ai ≠ . Let k ≥ 2 be an integer. We prove that if each k-wise and (k+1)-wise intersection of sets from A is empty, or a single point, or both open and path-connected, then fk+1=0 implies fk ≤ cfk-1 for some positive constant c depending only on k. Similarly, let b ≥ 2, k > 2b be integers. We prove that if each k-wise or (k+1)-wise intersection of sets from A has at most b path-connected components, which all are open, then fk+1=0 implies fk ≤ cfk-1 for some positive constant c depending only on b and k. These results also extend to two-dimensional compact surfaces.