Hardness of the Binary Covering Radius Problem in Large p Norms
Abstract
We study the hardness of the γ-approximate decisional Covering Radius Problem on lattices in the p norm (γ-GapCRPp). Specifically, we prove that there is an explicit function γ(p), with γ(p) > 1 for p > p0 ≈ 35.31 and p ∞ γ(p) = 9/8, such that for any constant > 0, (γ(p) - )-GapCRPp is NP-hard. This shows the first hardness of GapCRPp for explicit p < ∞. Work of Haviv and Regev (CCC, 2006 and CJTCS, 2012) previously showed 2-hardness of approximation for GapCRPp for all sufficiently large (but non-explicit) finite p and for p = ∞. In fact, our hardness results hold for a variant of GapCRP called the Binary Covering Radius Problem (BinGapCRP), which trivially reduces to both GapCRP and the decisional Linear Discrepancy Problem (LinDisc) in any norm in an approximation-preserving way. We also show 2-hardness of (9/8 - )-BinGapCRP in the ∞ norm for any constant > 0. Our work extends and heavily uses the work of Manurangsi (IPL, 2021), which showed 2-hardness of (9/8 - )-LinDisc in the ∞ norm.
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