(k+1)-sums versus k-sums
Abstract
A k-sum of a set A⊂eq Z is an integer that may be expressed as a sum of k distinct elements of A. How large can the ratio of the number of (k+1)-sums to the number of k-sums be? Writing k A for the set of k-sums of A we prove that \[ |(k+1) A||k A|\, \, |A|-kk+1 \] whenever |A| (k2+7k)/2. The inequality is tight -- the above ratio being attained when A is a geometric progression. This answers a question of Ruzsa.
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