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Selected Works of R.M. Dudley
For almost fifty years, Richard M. Dudley has been extremely influential in the development of several areas of Probability. His work on Gaussian processes led to the understanding of the basic fact that their sample boundedness and continuity should be characterized in terms of proper measures of complexity of their parameter spaces equipped with the intrinsic covariance metric. His sufficient condition for sample continuity in terms of metric entropy is widely used and was proved by X. Fernique to be necessary for stationary Gaussian processes, whereas its more subtle versions (majorizing measures) were proved by M. Talagrand to be necessary in general. Together with V. N. Vapnik and A. Y....
Hello, Dudley!
"You're in charge of Dudley's day. What will he do? What will he say"--Cover.
The Jewell Register
Thomas Jewell (1600?-1654) emigrated during or before 1639 from England to Hingham, Massachusetts, and later moved to Braintree, Massachusetts. Descendants and relatives lived in New England, New York, Ohio, Illinois and elsewhere.
