Worst--Case to Average--Case Reductions for SIS over integers
Abstract
In the present paper we study a non-modular variant of the Short Integer Solution problem over the integers. Given a random matrix A ∈ Zn× m with entries aij such that 0 aij< Q, for some Q>0, the goal is to find a nonzero vector x∈Zm such that A x= 0 and \| x\|∞ β, for a given bound β. We show that an algorithm that solves random instances of this problem with non-negligible probability yields a polynomial-time algorithm for approximating SIVP within a factor O(n3/2) (with 2 norm) in the worst case for any n-dimensional integer lattice.
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