Sharp Bounds for Sets with Distinct Subset Products
Abstract
Let A⊂eq [N] be such that for any pair of distinct subsets B,C⊂ A, the products Πb∈ Bb and Πc∈ Cc are distinct. We prove that |A|≤ π(N)+π(N1/2)+o(π(N1/2)), where π is the prime counting function, answering a question of Erdos.
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