Exponential Inequalities

Exponential Inequalities

Author: Associate Professor in International Human Rights Law Shreya Atrey

Publisher: Oxford University Press

Published: 2023-01-19

Total Pages: 401

ISBN-13: 0192872990

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This thoughtfully edited volume explores the operation of equality and discrimination law in times of crisis. It aims to understand how existing inequalities are exacerbated in crises and whether equality law has the tools to understand and address this contingency. Experience during the COVID-19 crisis shows that the pandemic has acted as a catalyst for 'exponential inequalities' related to racism, xenophobia, sexism, homophobia, transphobia, ageism, and ableism. Yet, the field of equality law (which is meant to be addressing such discrimination or inequality) has had little immediate relevance in mitigating these exponential inequalities. This is despite the fact that countries like the UK have a rather recent and state-of-the-art legislation in the field, namely the Equality Act 2010. Exponential Inequalities offers readers an understanding of how these inequalities came to be and how crises such as the global pandemic, the climate emergency, or the economic downturn, can exacerbate an already untenable situation. It illuminates both the structural and the conceptual, as well as the practical and doctrinal difficulties currently experienced in equality law, and discusses whether or not equality law even has the tools to both understand and then address this contingency. Written by a team of internationally recognized experts, Exponential Inequalities provides a comparative perspective on the functioning of equality laws across a range of contexts and jurisdictions and represents an essential read for scholars and policy makers alike.


Nonparametric Functional Estimation and Related Topics

Nonparametric Functional Estimation and Related Topics

Author: George Roussas

Publisher: Springer Science & Business Media

Published: 1991-04-30

Total Pages: 732

ISBN-13: 9780792312260

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About three years ago, an idea was discussed among some colleagues in the Division of Statistics at the University of California, Davis, as to the possibility of holding an international conference, focusing exclusively on nonparametric curve estimation. The fruition of this idea came about with the enthusiastic support of this project by Luc Devroye of McGill University, Canada, and Peter Robinson of the London School of Economics, UK. The response of colleagues, contacted to ascertain interest in participation in such a conference, was gratifying and made the effort involved worthwhile. Devroye and Robinson, together with this editor and George Metakides of the University of Patras, Greece and of the European Economic Communities, Brussels, formed the International Organizing Committee for a two week long Advanced Study Institute (ASI) sponsored by the Scientific Affairs Division of the North Atlantic Treaty Organization (NATO). The ASI was held on the Greek Island of Spetses between July 29 and August 10, 1990. Nonparametric functional estimation is a central topic in statistics, with applications in numerous substantive fields in mathematics, natural and social sciences, engineering and medicine. While there has been interest in nonparametric functional estimation for many years, this has grown of late, owing to increasing availability of large data sets and the ability to process them by means of improved computing facilities, along with the ability to display the results by means of sophisticated graphical procedures.


Inequalities In Analysis And Probability (Second Edition)

Inequalities In Analysis And Probability (Second Edition)

Author: Odile Pons

Publisher: World Scientific

Published: 2016-11-03

Total Pages: 309

ISBN-13: 9813144009

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The book is aimed at graduate students and researchers with basic knowledge of Probability and Integration Theory. It introduces classical inequalities in vector and functional spaces with applications to probability. It also develops new extensions of the analytical inequalities, with sharper bounds and generalizations to the sum or the supremum of random variables, to martingales and to transformed Brownian motions. The proofs of many new results are presented in great detail. Original tools are developed for spatial point processes and stochastic integration with respect to local martingales in the plane.This second edition covers properties of random variables and time continuous local martingales with a discontinuous predictable compensator, with exponential inequalities and new inequalities for their maximum variable and their p-variations. A chapter on stochastic calculus presents the exponential sub-martingales developed for stationary processes and their properties. Another chapter devoted itself to the renewal theory of processes and to semi-Markovian processes, branching processes and shock processes. The Chapman-Kolmogorov equations for strong semi-Markovian processes provide equations for their hitting times in a functional setting which extends the exponential properties of the Markovian processes.


Inequalities In Analysis And Probability

Inequalities In Analysis And Probability

Author: Odile Pons

Publisher: World Scientific

Published: 2012-11-29

Total Pages: 232

ISBN-13: 9814412597

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The book is aimed at graduate students and researchers with basic knowledge of Probability and Integration Theory. It introduces classical inequalities in vector and functional spaces with applications to probability. It also develops new extensions of the analytical inequalities, with sharper bounds and generalizations to the sum or the supremum of random variables, to martingales and to transformed Brownian motions. The proofs of the new results are presented in great detail.


Inequalities In Analysis And Probability (Third Edition)

Inequalities In Analysis And Probability (Third Edition)

Author: Odile Pons

Publisher: World Scientific

Published: 2021-10-18

Total Pages: 371

ISBN-13: 9811231362

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The book introduces classical inequalities in vector and functional spaces with applications to probability. It develops new analytical inequalities, with sharper bounds and generalizations to the sum or the supremum of random variables, to martingales, to transformed Brownian motions and diffusions, to Markov and point processes, renewal, branching and shock processes.In this third edition, the inequalities for martingales are presented in two chapters for discrete and time-continuous local martingales with new results for the bound of the norms of a martingale by the norms of the predictable processes of its quadratic variations, for the norms of their supremum and their p-variations. More inequalities are also covered for the tail probabilities of Gaussian processes and for spatial processes.This book is well-suited for undergraduate and graduate students as well as researchers in theoretical and applied mathematics.


High Dimensional Probability II

High Dimensional Probability II

Author: Evarist Giné

Publisher: Springer Science & Business Media

Published: 2012-12-06

Total Pages: 491

ISBN-13: 1461213584

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High dimensional probability, in the sense that encompasses the topics rep resented in this volume, began about thirty years ago with research in two related areas: limit theorems for sums of independent Banach space valued random vectors and general Gaussian processes. An important feature in these past research studies has been the fact that they highlighted the es sential probabilistic nature of the problems considered. In part, this was because, by working on a general Banach space, one had to discard the extra, and often extraneous, structure imposed by random variables taking values in a Euclidean space, or by processes being indexed by sets in R or Rd. Doing this led to striking advances, particularly in Gaussian process theory. It also led to the creation or introduction of powerful new tools, such as randomization, decoupling, moment and exponential inequalities, chaining, isoperimetry and concentration of measure, which apply to areas well beyond those for which they were created. The general theory of em pirical processes, with its vast applications in statistics, the study of local times of Markov processes, certain problems in harmonic analysis, and the general theory of stochastic processes are just several of the broad areas in which Gaussian process techniques and techniques from probability in Banach spaces have made a substantial impact. Parallel to this work on probability in Banach spaces, classical proba bility and empirical process theory were enriched by the development of powerful results in strong approximations.


Concentration Inequalities

Concentration Inequalities

Author: Stéphane Boucheron

Publisher: OUP Oxford

Published: 2013-02-08

Total Pages: 492

ISBN-13: 0191655503

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Concentration inequalities for functions of independent random variables is an area of probability theory that has witnessed a great revolution in the last few decades, and has applications in a wide variety of areas such as machine learning, statistics, discrete mathematics, and high-dimensional geometry. Roughly speaking, if a function of many independent random variables does not depend too much on any of the variables then it is concentrated in the sense that with high probability, it is close to its expected value. This book offers a host of inequalities to illustrate this rich theory in an accessible way by covering the key developments and applications in the field. The authors describe the interplay between the probabilistic structure (independence) and a variety of tools ranging from functional inequalities to transportation arguments to information theory. Applications to the study of empirical processes, random projections, random matrix theory, and threshold phenomena are also presented. A self-contained introduction to concentration inequalities, it includes a survey of concentration of sums of independent random variables, variance bounds, the entropy method, and the transportation method. Deep connections with isoperimetric problems are revealed whilst special attention is paid to applications to the supremum of empirical processes. Written by leading experts in the field and containing extensive exercise sections this book will be an invaluable resource for researchers and graduate students in mathematics, theoretical computer science, and engineering.


Stochastic Inequalities and Applications

Stochastic Inequalities and Applications

Author: Evariste Giné

Publisher: Birkhäuser

Published: 2012-12-06

Total Pages: 362

ISBN-13: 3034880693

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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.


Advances in Mathematical Inequalities

Advances in Mathematical Inequalities

Author: Shigeru Furuichi

Publisher: Walter de Gruyter GmbH & Co KG

Published: 2020-01-20

Total Pages: 268

ISBN-13: 3110643472

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Mathematical inequalities are essential tools in mathematics, natural science and engineering. This book gives an overview on recent advances. Some generalizations and improvements for the classical and well-known inequalities are described. They will be applied and further developed in many fields. Applications of the inequalities to entropy theory and quantum physics are also included.


Asymptotic Theory of Weakly Dependent Random Processes

Asymptotic Theory of Weakly Dependent Random Processes

Author: Emmanuel Rio

Publisher: Springer

Published: 2017-04-13

Total Pages: 211

ISBN-13: 3662543230

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Ces notes sont consacrées aux inégalités et aux théorèmes limites classiques pour les suites de variables aléatoires absolument régulières ou fortement mélangeantes au sens de Rosenblatt. Le but poursuivi est de donner des outils techniques pour l'étude des processus faiblement dépendants aux statisticiens ou aux probabilistes travaillant sur ces processus.