Lattice Problems, Gauge Functions and Parameterized Algorithms

Abstract

Given a k-dimensional subspace M⊂eq n and a full rank integer lattice L⊂eq n, the subspace avoiding problem SAP is to find a shortest vector in L M. Treating k as a parameter, we obtain new parameterized approximation and exact algorithms for SAP based on the AKS sieving technique. More precisely, we give a randomized (1+ε)-approximation algorithm for parameterized SAP that runs in time 2O(n).(1/ε)k, where the parameter k is the dimension of the subspace M. Thus, we obtain a 2O(n) time algorithm for ε=2-O(n/k). We also give a 2O(n+k k) exact algorithm for the parameterized SAP for any p norm. Several of our algorithms work for all gauge functions as metric with some natural restrictions, in particular for all p norms. We also prove an (2n) lower bound on the query complexity of AKS sieving based exact algorithms for SVP that accesses the gauge function as oracle.