The m-th Element of a Sidon Set
Abstract
We prove that if A=\a1,… ,a|A|\⊂ \1,2,… ,n\ is a Sidon set so that |A|=n1/2-L, then am = m· n1/2 + O( n7/8) + O(L1/2· n3/4) where L=\0,L\. As an application of this, we give easy proofs of some previously derived results. We proceed on to proving that for a dense Sidon set S and for any >0, we have Σa∈ S a = 12 n3/2 + O (n11/8 ) for all n N but at most O (N 45 + ) exceptions.
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