On sequences of projections of the cubic lattice
Abstract
In this paper we study sequences of lattices which are, up to similarity, projections of Zn+1 onto a hyperplane v, with v ∈ Zn+1 and converge to a target lattice which is equivalent to an integer lattice. We show a sufficient condition to construct sequences converging at rate O(1/ |v|2/n) and exhibit explicit constructions for some important families of lattices.
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