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High Dimensional Probability VI - The Banff Volume (Hardcover, 2013 ed.): Christian Houdre, David M. Mason, Jan Rosinski, Jon... High Dimensional Probability VI - The Banff Volume (Hardcover, 2013 ed.)
Christian Houdre, David M. Mason, Jan Rosinski, Jon A. Wellner
R5,325 R4,758 Discovery Miles 47 580 Save R567 (11%) Ships in 12 - 17 working days

This is a collection of papers by participants at 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 volumeshow 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.

Stochastic Inequalities and Applications (Hardcover, 2003 ed.): Evariste Gine, Christian Houdre, David Nualart Stochastic Inequalities and Applications (Hardcover, 2003 ed.)
Evariste Gine, Christian Houdre, David Nualart
R2,853 Discovery Miles 28 530 Ships in 10 - 15 working days

Concentration inequalities, which express the fact that certain complicated random variables are almost constant, have proven of utmost importance in many areas of probability and statistics. This volume contains refined versions of these inequalities, and their relationship to many applications particularly in stochastic analysis. The broad range and the high quality of the contributions make this book highly attractive for graduates, postgraduates and researchers in the above areas.

High Dimensional Probability VII - The Cargese Volume (Hardcover, 1st ed. 2016): Christian Houdre, David M. Mason, Patricia... High Dimensional Probability VII - The Cargese Volume (Hardcover, 1st ed. 2016)
Christian Houdre, David M. Mason, Patricia Reynaud-Bouret, Jan Rosinski
R4,879 R3,594 Discovery Miles 35 940 Save R1,285 (26%) Ships in 12 - 17 working days

This volume collects selected papers from the 7th High Dimensional Probability meeting held at the Institut d'Etudes Scientifiques de Cargese (IESC) in Corsica, France. 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 subfields of mathematics, statistics, and computer science. These include random matrices, nonparametric statistics, empirical processes, statistical learning theory, concentration of measure phenomena, strong and weak approximations, functional estimation, combinatorial optimization, and random graphs. The contributions in this volume show that HDP theory continues to thrive and develop new tools, methods, techniques and perspectives to analyze random phenomena.

High Dimensional Probability VII - The Cargese Volume (Paperback, Softcover reprint of the original 1st ed. 2016): Christian... High Dimensional Probability VII - The Cargese Volume (Paperback, Softcover reprint of the original 1st ed. 2016)
Christian Houdre, David M. Mason, Patricia Reynaud-Bouret, Jan Rosinski
R2,846 Discovery Miles 28 460 Ships in 10 - 15 working days

This volume collects selected papers from the 7th High Dimensional Probability meeting held at the Institut d'Etudes Scientifiques de Cargese (IESC) in Corsica, France. 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 subfields of mathematics, statistics, and computer science. These include random matrices, nonparametric statistics, empirical processes, statistical learning theory, concentration of measure phenomena, strong and weak approximations, functional estimation, combinatorial optimization, and random graphs. The contributions in this volume show that HDP theory continues to thrive and develop new tools, methods, techniques and perspectives to analyze random phenomena.

High Dimensional Probability VI - The Banff Volume (Paperback, 2013 ed.): Christian Houdre, David M. Mason, Jan Rosinski, Jon... High Dimensional Probability VI - The Banff Volume (Paperback, 2013 ed.)
Christian Houdre, David M. Mason, Jan Rosinski, Jon A. Wellner
R5,290 Discovery Miles 52 900 Ships in 10 - 15 working days

This is a collection of papers by participants at 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.

Stochastic Inequalities and Applications (Paperback, Softcover reprint of the original 1st ed. 2003): Evariste Gine, Christian... Stochastic Inequalities and Applications (Paperback, Softcover reprint of the original 1st ed. 2003)
Evariste Gine, Christian Houdre, David Nualart
R2,813 Discovery Miles 28 130 Ships in 10 - 15 working days

Concentration inequalities, which express the fact that certain complicated random variables are almost constant, have proven of utmost importance in many areas of probability and statistics. This volume contains refined versions of these inequalities, and their relationship to many applications particularly in stochastic analysis. The broad range and the high quality of the contributions make this book highly attractive for graduates, postgraduates and researchers in the above areas.

On Stein's Method for Infinitely Divisible Laws with Finite First Moment (Paperback, 1st ed. 2019): Benjamin Arras,... On Stein's Method for Infinitely Divisible Laws with Finite First Moment (Paperback, 1st ed. 2019)
Benjamin Arras, Christian Houdre
R1,469 Discovery Miles 14 690 Ships in 10 - 15 working days

This book focuses on quantitative approximation results for weak limit theorems when the target limiting law is infinitely divisible with finite first moment. Two methods are presented and developed to obtain such quantitative results. At the root of these methods stands a Stein characterizing identity discussed in the third chapter and obtained thanks to a covariance representation of infinitely divisible distributions. The first method is based on characteristic functions and Stein type identities when the involved sequence of random variables is itself infinitely divisible with finite first moment. In particular, based on this technique, quantitative versions of compound Poisson approximation of infinitely divisible distributions are presented. The second method is a general Stein's method approach for univariate selfdecomposable laws with finite first moment. Chapter 6 is concerned with applications and provides general upper bounds to quantify the rate of convergence in classical weak limit theorems for sums of independent random variables. This book is aimed at graduate students and researchers working in probability theory and mathematical statistics.

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