An upper bound on the size of Sidon sets
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In this entry point into the subject, combining two elementary proofs, we decrease the gap between the upper and lower bounds by 0.2% in a classical combinatorial number theory problem. We show that the maximum size of a Sidon set of { 1, 2, …, n} is at most √(n)+ 0.998n^1/4 for sufficiently large n.
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