A Note on the Concrete Hardness of the Shortest Independent Vectors Problem in Lattices

Abstract

Bl\"omer and Seifert showed that SIVP2 is NP-hard to approximate by giving a reduction from CVP2 to SIVP2 for constant approximation factors as long as the CVP instance has a certain property. In order to formally define this requirement on the CVP instance, we introduce a new computational problem called the Gap Closest Vector Problem with Bounded Minima. We adapt the proof of Bl\"omer and Seifert to show a reduction from the Gap Closest Vector Problem with Bounded Minima to SIVP for any p norm for some constant approximation factor greater than 1. In a recent result, Bennett, Golovnev and Stephens-Davidowitz showed that under Gap-ETH, there is no 2o(n)-time algorithm for approximating CVPp up to some constant factor γ ≥ 1 for any 1 ≤ p ≤ ∞. We observe that the reduction in their paper can be viewed as a reduction from Gap3SAT to the Gap Closest Vector Problem with Bounded Minima. This, together with the above mentioned reduction, implies that, under Gap-ETH, there is no 2o(n)-time algorithm for approximating SIVPp up to some constant factor γ ≥ 1 for any 1 ≤ p ≤ ∞.