Extended inverse theorems for h-fold sumsets in integers
Abstract
Let h ≥ 2, k ≥ 5 be integers and A be a nonempty finite set of k integers. Very recently, Tang and Xing studied extended inverse theorems for hk-h+1 < |hA| ≤ hk+2h-3. In this paper, we extend the work of Tang and Xing and study all possible inverse theorems for hk-h+1<|hA| ≤ hk+3h-4. Furthermore, we give a range of |hA| for which inverse problems are not possible.
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