Hermite versus Minkowski
Abstract
We compare for an n-dimensional Euclidean lattice the smallest possible values of the product of the norms of n~vectors which either constitute a basis for (Hermite-type inequalities) or are merely assumed to be independent (Minkowski-type inequalities). We improve on 1953 results of van der Waerden in dimensions 6 to 8 and prove partial result in dimension~9.
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