On the size of k-fold sum and product sets of integers
Abstract
We prove the following theorem: for all positive integers b there exists a positive integer k, such that for every finite set A of integers with cardinality |A| > 1, we have either |A + ... + A| ≥ |A|b or |A · ... · A| ≥ |A|b where A + ... + A and A · ... · A are the collections of k-fold sums and products of elements of A respectively. This is progress towards a conjecture of Erd\"os and Szemer\'edi on sum and product sets.
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