Finding a closest point in a lattice of Voronoi's first kind
Abstract
We show that for those lattices of Voronoi's first kind with known obtuse superbasis, a closest lattice point can be computed in O(n4) operations where n is the dimension of the lattice. To achieve this a series of relevant lattice vectors that converges to a closest lattice point is found. We show that the series converges after at most n terms. Each vector in the series can be efficiently computed in O(n3) operations using an algorithm to compute a minimum cut in an undirected flow network.
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