Restricted sums of sets of cardinality 2p + 1 in Zp2
Abstract
Let A⊂eq Zp2 be a set of size 2p+1 for prime p≥ 5. In this paper, we prove that A+A=\a1+a2 a1,a2∈ A, a1≠ a2\ has cardinality at least 4p. This result is the first advancement in over two decades on a variant of the Erdos-Heilbronn problem studied by Eliahou and Kervaire.
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