Large B2[g] subsets of the first squares
Abstract
We prove that, for every fixed integer g≥ 1, the largest cardinality of a B2[g] subset of the first n squares is at least a positive constant, depending only on g, times n2g2g+1( n)2-2g2g+1, for all sufficiently large n. For g=1, this recovers the theorem of Lefmann and Thiele on Sidon subsets of the first squares. The proof follows their hypergraph method, but replaces the 4-uniform hypergraph encoding two representations as a sum of two squares by a 2(g+1)-uniform hypergraph encoding g+1 such representations. The main point is to verify that this higher-uniformity hypergraph has few edges and few 2-cycles; the lower bound then follows from an independence theorem for uncrowded hypergraphs due to Duke, Lefmann and Rödl.
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