Constructions of Bh sets in various dimensions

Abstract

Let A ⊂ Z⁺ and h be positive integer.We say that A is a B_h set if any integern can be written in at most one-ways as the sum of h elements of A, The fundamental problem is to determine the cardinal maximum of a set Bh contained in the integer interval [1, n] := {1, 2, 3, . . . , n}. Not many constructions of integer sets Bh are known, among them are Singer [13], Bose-Chowla [3] and Gómez-Trujillo [7]. The Bh set concept can be extended to arbitrary groups. In this article, the generalized constructions on the groups that come from a field are presented and new construction of a set B_h+s in h + 1 dimensions is obtained.

Keywords

$B_h$ Set, $B_2$ Set, Field extension

References

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