On lattice width of lattice-free polyhedra and height of Hilbert bases

Abstract

We study the lattice width of lattice-free polyhedra given by Ax≤b in terms of (A), the maximal n× n minor in absolute value of A∈Zm× n. Our main contribution is to link the lattice width of lattice-free polyhedra to the height of Hilbert bases and to the diameter of finite abelian groups. This leads to a bound on the lattice width of lattice-free pyramids which solely depends on (A) provided a conjecture regarding the height of Hilbert bases holds. Further, we exploit a combination of techniques to obtain novel bounds on the lattice width of simplices. A second part of the paper is devoted to a study of the above mentioned Hilbert basis conjecture. We give a complete characterization of the Hilbert basis if (A) = 2 which implies the conjecture in that case and prove its validity for simplicial cones.

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