Possible Sizes of Sumsets

Abstract

Nathanson introduced the range of cardinalities of h-fold sumsets R(h,k) := \|hA|:A ⊂ Z and |A| = k\. Following a remark of Erdos and Szemer\'edi that determined the form of R(h,k) when h=2, Nathanson asked what the form of R(h,k) is for arbitrary h, k ∈ N. For h ∈ N, we prove there is some constant kh ∈ N such that if k > kh, then R(h,k) is the entire interval [hk-h+1,h+k-1h] except for a specified set of h-12 numbers. Moreover, we show that one can take k3 = 2.

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