Metric Entropy of the Grassmann Manifold
نویسنده
چکیده
The knowledge of the metric entropy of precompact subsets of operators on finite dimensional Euclidean space is important in particular in the probabilistic methods developped by E. D. Gluskin and S. Szarek for constructing certain random Banach spaces. We give a new argument for estimating the metric entropy of some subsets such as the Grassmann manifold equipped with natural metrics. Here, the Grassmann manifold is thought of as the set of orthogonal projection of given rank.
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