A remark on \(B_{2k}\)-sequences (Q1340273)

Improving a result of \textit{S. Chen} [Acta Arith. 64, 325-330 (1993; Zbl 0781.11010)], the author proves that any set \(A\) of integers such that all the \(2k\)-fold sums of elements of \(A\) are distinct satisfies \[ \liminf A(n) n^{-1/ (2k)} (\log n)^{-1/ (3k-1)} <\infty. \] (For odd numbers still no comparable estimate is known.).