A01=R. M. Dudley
Absolutely Continuous
additivity
advanced probability concepts for researchers
Author_R. M. Dudley
Banach Space
borel
Borel Cantelli Lemma
Borel Sets
Category=PBK
Category=PBKA
Category=PBTB
Compact Hausdorff Space
Compact Metric Space
Complete Separable Metric Space
Conditional Expectations
Continuous Real Function
countable
Disjoint Borel Sets
Distribution Function
eq_isMigrated=1
eq_isMigrated=2
eq_nobargain
ergodic theory
Finite Disjoint Unions
Finitely Additive
functional analysis
Independent Real Random Variables
lebesgue
Lebesgue Measurable Set
Lebesgue Measure
martingale convergence
measure
measure theory
metric
Metric Space
metric space topology
Monotone Convergence
Normed Linear Space
Radon Nikodym Theorem
random
Richard M. Dudley
Riemann Integral
Separable Metric Space
set
space
stochastic processes
Tonelli Fubini Theorem
topological
Topological Space
Uniformly Tight
Product details
- ISBN 9781315897097
- Weight: 990g
- Dimensions: 156 x 234mm
- Publication Date: 08 Dec 2017
- Publisher: Taylor & Francis Ltd
- Publication City/Country: GB
- Product Form: Hardback
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Written by one of the best-known probabilists in the world this text offers a clear and modern presentation of modern probability theory and an exposition of the interplay between the properties of metric spaces and those of probability measures. This text is the first at this level to include discussions of the subadditive ergodic theorems, metrics for convergence in laws and the Borel isomorphism theory. The proofs for the theorems are consistently brief and clear and each chapter concludes with a set of historical notes and references. This book should be of interest to students taking degree courses in real analysis and/or probability theory.
