Dense Subset Sum in Multi-Dimension

Abstract

We study the additive structure of dense subset sum in multi-dimension, and use the structure to develop efficient algorithms for the dense subset sum problem. More precisely, given a set A of n vectors in the d-dimensional hyperrectangle [N1]× [N2]×·s× [Nd], we study the structure of S(A), which is the set of all subset sums of A. We focus on the dense regime of the problem where n Φ and Φ= N1 × ·s × Nd. We show that for any constant d≥ 1, if n Φ, then S(A) contains a long generalized progression in multi-dimension. If we further have that no non-trivial lattice can contain the majority of A, then S(A) contains all the integer points in the zonotope \x1a1 + ·s + xnan: o(1)≤ xj ≤ 1-o(1), xj ∈ R\. Compared to the previous results for d ≥ 2, our result significantly reduces the density threshold and enlarges the region inside which all the integer points belong to S(A). Also, it matches the bound for the 1-dimensional case. Using our combinatorics result, we also develop an O(n)-time algorithm for the dense subset sum problem in multi-dimension.

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