Metric entropy
2017-02-13 — 2017-02-13
Wherein metric sizes of sets are measured by packing, covering and bracketing numbers in metric spaces, and connections to Rademacher and Gaussian complexities are elucidated.
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Packing, covering, bracketing, capacities in metric spaces, measuring sizes of irascible sets. As used in empirical process theory, stochastic processes, concentration inequalities, Rademacher and Gaussian complexities in statistical learning theory and so on.
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