The number of rational numbers determined by large sets of integers

Abstract

When A and B are subsets of the integers in [1,X] and [1,Y] respectively, with |A| ≥ α X and |B| ≥ β X, we show that the number of rational numbers expressible as a/b with (a,b) in A × B is (α β)1+εXY for any ε > 0, where the implied constant depends on ε alone. We then construct examples that show that this bound cannot in general be improved to α β XY. We also resolve the natural generalisation of our problem to arbitrary subsets C of the integer points in [1,X] × [1,Y]. Finally, we apply our results to answer a question of S\'ark\"ozy concerning the differences of consecutive terms of the product sequence of a given integer sequence.