Approximate CVPp in time 20.802 \, n
Abstract
We show that a constant factor approximation of the shortest and closest lattice vector problem w.r.t. any p-norm can be computed in time 2(0.802 +ε)\, n. This matches the currently fastest constant factor approximation algorithm for the shortest vector problem w.r.t. 2. To obtain our result, we combine the latter algorithm w.r.t. 2 with geometric insights related to coverings.
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