06451nam 22007575 450 991043814490332120200701125431.03-0348-0490-310.1007/978-3-0348-0490-5(CKB)2670000000371071(EBL)1205477(SSID)ssj0000907317(PQKBManifestationID)11503721(PQKBTitleCode)TC0000907317(PQKBWorkID)10884665(PQKB)11678592(DE-He213)978-3-0348-0490-5(MiAaPQ)EBC1205477(PPN)169137201(EXLCZ)99267000000037107120130420d2013 u| 0engur|n|---|||||txtccrHigh Dimensional Probability VI The Banff Volume /edited by Christian Houdré, David M. Mason, Jan Rosiński, Jon A. Wellner1st ed. 2013.Basel :Springer Basel :Imprint: Birkhäuser,2013.1 online resource (373 p.)Progress in Probability,1050-6977 ;66Description based upon print version of record.3-0348-0799-6 3-0348-0489-X Includes bibliographical references.Contents; Preface; Inequalities and Convexity:; Limit Theorems:; Stochastic Processes:; Random Matrices and Applications:; High Dimensional Statistics:; Participants; Dedication; Part I Inequalities and Convexity; Bracketing Entropy of High Dimensional Distributions; 1. Introduction; 2. Bracketing entropy estimate; 3. Bounding bracketing entropy using metric entropy; Acknowledgement; References; Slepian's Inequality, Modularity and Integral Orderings; 1. Introduction; 2. Slepian's inequality; 3. Integral orderings; 4. Modular orderings; ReferencesA More General Maximal Bernstein-type Inequality1. Introduction; Acknowledgment; References; Maximal Inequalities for Centered Norms of Sums of Independent Random Vectors; 1. Introduction and main results; 2. Proofs; 3. Example; References; A Probabilistic Inequality Related to Negative Definite Functions; 1. Introduction; 2. Main result; 3. A relation to random processes; 4. Relation to bifractional Brownian motion; 5. A counterexample; Acknowledgement; References; Optimal Re-centering Bounds, with Applications to Rosenthal-type Concentration of Measure Inequalities; 1. Introduction2. Summary and discussion3. Application: Rosenthal-type concentration inequalities for separately Lipschitz functions on product spaces; 4. Proofs; Acknowledgment; References; Strong Log-concavity is Preserved by Convolution; 1. Log-concavity and ultra-log-concavity for discrete distributions; 2. Log-concavity and strong-log-concavity for continuous distributions on R; 3. Appendix: strong convexity and strong log-concavity; Acknowledgment; References; On Some Gaussian Concentration Inequality for Non-Lipschitz Functions; 1. Introduction; 2. The result; 3. Application to U-statisticsReferencesPart II Limit Theorems; Rates of Convergence in the Strong Invariance Principle for Non-adapted Sequences. Application to Ergodic Automorphisms of the Torus; 1. Introduction and notations; 2. ASIP with rates for ergodic automorphisms of the torus; 3. Probabilistic results; 4. Proof of Theorem 2.1; 4.1. Preparatory material; 4.2. End of the proof of Theorem 2.1; 5. Appendix; References; On the Rate of Convergence to the Semi-circular Law; 1. Introduction; 2. Bounds for the Kolmogorov distance between distribution functions via Stieltjes transforms; 3. Large deviations I4.3. Empirical process CLT's over C for other independent increment processes and martingalesThis is a collection of papers by participants at the High Dimensional Probability VI Meeting held from October 9-14, 2011 at the Banff International Research Station in Banff, Alberta, Canada.  High Dimensional Probability (HDP) is an area of mathematics that includes the study of probability distributions and limit theorems in infinite dimensional spaces such as Hilbert spaces and Banach spaces. The most remarkable feature of this area is that it has resulted in the creation of powerful new tools and perspectives, whose range of application has led to interactions with other areas of mathematics, statistics, and computer science. These include random matrix theory, nonparametric statistics, empirical process theory, statistical learning theory, concentration of measure phenomena, strong and weak approximations, distribution function estimation in high dimensions, combinatorial optimization, and random graph theory. The papers in this volume show that HDP theory continues to develop new tools, methods, techniques and perspectives to analyze the random phenomena. Both researchers and advanced students will find this book of great use for learning about new avenues of research.Progress in Probability,1050-6977 ;66ProbabilitiesComputer science—MathematicsComputer mathematicsCalculus of variationsProbability Theory and Stochastic Processeshttps://scigraph.springernature.com/ontologies/product-market-codes/M27004Mathematical Applications in Computer Sciencehttps://scigraph.springernature.com/ontologies/product-market-codes/M13110Calculus of Variations and Optimal Control; Optimizationhttps://scigraph.springernature.com/ontologies/product-market-codes/M26016Probabilities.Computer science—Mathematics.Computer mathematics.Calculus of variations.Probability Theory and Stochastic Processes.Mathematical Applications in Computer Science.Calculus of Variations and Optimal Control; Optimization.519.2519.2Houdré Christianedthttp://id.loc.gov/vocabulary/relators/edtMason David Medthttp://id.loc.gov/vocabulary/relators/edtRosiński Janedthttp://id.loc.gov/vocabulary/relators/edtWellner Jon Aedthttp://id.loc.gov/vocabulary/relators/edtBOOK9910438144903321High Dimensional Probability VI2538845UNINA