A simple proof of a reverse Minkowski theorem for integral lattices
Abstract
We prove that for any integral lattice L ⊂ Rn (that is, a lattice L such that the inner product y1,y2 is an integer for all y1, y2 ∈ L) and any positive integer k, \[ |\ y ∈ L \ : \ \|y\|2 = k\| ≤ 2 n+2k-22k-1 \; , \] giving a nearly tight reverse Minkowski theorem for integral lattices.
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