Restricted sumsets in Z
Abstract
Let k≥slant 3 and let A=\0=a0<a1<·s<ak-1\ with (A)=1. Freiman-Lev conjecture [V.F. Lev, Restricted set addition in groups, I. The classical setting, J. London Math. Soc. 62(2000), 27-40] is a well-known conjecture which related to restricted sumsets. Up to now, Freiman-Lev conjecture is open for all ak-1≥slant 2k-2. In this paper, we prove the Freiman-Lev conjecture is true for ak-1≥slant 2k-2 and ak-2<2k-4. That is, Freiman-Lev conjecture is still open for the case ak-1≥slant 2k-2 and ak-2≥ 2k-4.
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