The structure of higher sumsets
Abstract
Merging together a result of Nathanson from the early 70s and a recent result of Granville and Walker, we show that for any finite set A of integers with (A)=0 and (A)=1 there exist two sets, the "head" and the "tail", such that if m(A)-|A|+2, then the m-fold sumset mA consists of the union of these sets and a long block of consecutive integers separating them. We give sharp estimates for the length of the block, and investigate the corresponding stability problem classifying those sets A for which the bound (A)-|A|+2 cannot be substantially improved.
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