Direct and Inverse Problems for Restricted Signed Sumsets -- I
Abstract
Let A=\a1,…,ak\ be a nonempty finite subset of an additive abelian group G. For a positive integer h, the h-fold signed sumset of A, denoted by hA, is defined as hA= Σi=1k λi ai: λi ∈ \-h, …, 0, …, h\ \ for \ i= 1, 2, …, k \ and \ Σi=1k |λi | =h, and the restricted h-fold signed sumset of A, denoted by hA, is defined as hA= Σi=1k λi ai: λi ∈ -1, 0, 1 \ for \ i= 1, 2, …, k \ and \ Σi=1k |λi | = h. A direct problem for the sumset hA is to find the optimal size of hA in terms of h and |A|. An inverse problem for this sumset is to determine the structure of the underlying set A when the sumset hA has optimal size. While some results are known for the signed sumsets in finite abelian groups due to Bajnok and Matzke, not much is known for the restricted h-fold signed sumset hA even in the additive group of integers Z. In case of G = Z, Bhanja, Komatsu and Pandey studied these problems for the sumset hA for h=2, 3, and k, and conjectured the direct and inverse results for h ≥ 4. In this paper, we prove these conjectures completely for the sets of positive integers. In a subsequent paper, we prove these conjectures for the sets of nonnegative integers.
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