On restricted sumsets over a field
Abstract
We consider restricted sumsets over field F. Letalign*C=\a1+·s+an:a1∈ A1,…,an∈ An, ai-aj Sij\ if\ i=j\,align* where Sij(1≤slant i=j≤slant n) are finite subsets of F with cardinality m, and A1,…, An are finite nonempty subsets of F with |A1|=·s=|An|=k. Let p(F) be the additive order of the identity of F. It is proved that |C|≥slant \p(F),\ \ n(k-1)-mn(n-1)+1\ if p(F)>mn. This conclusion refines the result of Hou and Sun.
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