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1 results

  • Approximating the densest sublattice from Rankin’s inequality

  • Part of
  • Jianwei Li, Phong Q. Nguyen
  • Journal:
    LMS Journal of Computation and Mathematics / Volume 17 / Issue A / 2014
    Published online by Cambridge University Press:
    01 August 2014, pp. 92-111
    • Article
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  • We present a higher-dimensional generalization of the Gama–Nguyen algorithm (STOC ’08) for approximating the shortest vector problem in a lattice. This generalization approximates the densest sublattice by using a subroutine solving the exact problem in low dimension, such as the Dadush–Micciancio algorithm (SODA ’13). Our approximation factor corresponds to a natural inequality on Rankin’s constant derived from Rankin’s inequality.