On a Geometric Interpretation Of the Subset Sum Problem
Abstract
For S ∈ Nn and T ∈ N, the Subset Sum Problem (SSP) ∃? x ∈ \0,1\n such that ST· x = T can be interpreted as the problem of deciding whether the intersection of the positive unit hypercube Qn = [0,1]n with the hyperplane ST· (x - S\|S\|2 · T ) = 0 contains at least a vertex. In this paper, we give an algorithm of complexity O( 1ε· nb ), for some absolute constant b, which either proves that there are no vertices in a slab of thickness ε either finds a vertex in the slab of thickness 4· ε. It is shown that any vertex P in a slab of thickness ε meets | ST· PT - 1 | ≤ ε, therefore making the proposed algorithm a FPTAS for the SSP. The results are then applied to the study of the so called Simultaneous Subset-Sum Problem (SSSP).
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