Unimodular covers of multiples of polytopes
classification
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unimodularcoversmultiplesnaturalnumberactuallyanalogousbound
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Let P be a d-dimensional lattice polytope. We show that there exists a natural number c_d, only depending on d, such that the multiples cP have a unimodular cover for every natural number c >= c_d. Actually, a subexponential upper bound for c_d is provided, together with an analogous result for unimodular covers of rational cones.
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