Large Convex sets in Difference sets
Abstract
We give a construction of a convex set A ⊂ R with cardinality n such that A-A contains a convex subset with cardinality (n2). We also consider the following variant of this problem: given a convex set A, what is the size of the largest matching M ⊂ A × A such that the set \[ \ a-b : (a,b) ∈ M \ \] is convex? We prove that there always exists such an M with |M| ≥ n, and that this lower bound is best possible, up a multiplicative constant.
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