On the Erdos-Tur\'an Conjecture and the growth of B2[g] sequences

Abstract

When g∈N we say that A⊂N is a B2[g] sequence if every m∈N has at most g distinct representations of the shape m=b1+b2 with b1≤ b2 and b1,b2∈ A. We show for every 0<<1 that whenever g>1 then there is a B2[g] sequence A having the property that every sufficiently large n∈N can be written as n=a1+a2+a3,\ \ \ \ \ \ \ \ \ a3≤ n\ \ \ \ \ \ \ \ \ ai∈ A, and satisfying for large x the estimate A [1,x] xg/(2g+1). The above lower bound improves upon earlier results of Cilleruelo and of Erdos and Renyi.

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