Heffter arrays over partial loops
Abstract
A Heffter array over an additive group G is any partially filled array A satisfying that: (1) each one of its rows and columns sum to zero in G, and (2) if i∈ G\0\, then either i or -i appears exactly once in A. In this paper, this notion is naturally generalized to that of B-Heffter array over a partial loop, where B is a set of block-sum polynomials over an affine 1-design on the set of entries in A.
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