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.

approximation
functional analysis
measure
probability
statistics

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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