Infinite Dimensional Discrimination And Classification

Infinite Dimensional Discrimination and Classification

Author : Hyejin Shin

Publisher :

Page : pages

File Size : 20,19 MB

Release : 2007

Category :

ISBN :

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Book Description

Modern data collection methods are now frequently returning observations that should be viewed as the result of digitized recording or sampling from stochastic processes rather than vectors of finite length. In spite of great demands, only a few classification methodologies for such data have been suggested and supporting theory is quite limited. The focus of this dissertation is on discrimination and classification in this infinite dimensional setting. The methodology and theory we develop are based on the abstract canonical correlation concept of Eubank and Hsing (2005), and motivated by the fact that Fisher's discriminant analysis method is intimately tied to canonical correlation analysis. Specifically, we have developed a theoretical framework for discrimination and classification of sample paths from stochastic processes through use of the Loève-Parzen isomorphism that connects a second order process to the reproducing kernel Hilbert space generated by its covariance kernel. This approach provides a seamless transition between the finite and infinite dimensional settings and lends itself well to computation via smoothing and regularization. In addition, we have developed a new computational procedure and illustrated it with simulated data and Canadian weather data.



Contributions in infinite-dimensional statistics and related topics

Author : Enea G. Bongiorno

Publisher : Società Editrice Esculapio

Page : 300 pages

File Size : 29,78 MB

Release : 2014-05-21

Category : Mathematics

ISBN : 8874887639

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Book Description

The interest towards Functional and Operatorial Statistics, and, more in general, towards infinite-dimensional statistics has dramatically increased in the statistical community and in many other applied scientific areas where people faces functional data. This volume collects the works selected and presented at the Third Edition of the International Workshop on Functional and Operatorial Statistics held in Stresa, Italy, from the 19th to the 21st of June 2014 (IWFOS’2014). The meeting represents an opportunity of bringing together leading researchers active on these topics both for what concerns theoretical aspects and a wide range of applications in various fields. To promote collaborations with other important strictly related areas of infinite-dimensional Statistics, such as High Dimensional Statistics and Model Selection Procedures, this book hosts works in the latter research subjects too.



Nonparametric Functional Data Analysis

Author : Frédéric Ferraty

Publisher : Springer Science & Business Media

Page : 260 pages

File Size : 31,35 MB

Release : 2006-11-22

Category : Mathematics

ISBN : 0387366202

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Book Description

Modern apparatuses allow us to collect samples of functional data, mainly curves but also images. On the other hand, nonparametric statistics produces useful tools for standard data exploration. This book links these two fields of modern statistics by explaining how functional data can be studied through parameter-free statistical ideas. At the same time it shows how functional data can be studied through parameter-free statistical ideas, and offers an original presentation of new nonparametric statistical methods for functional data analysis.



OAR

Author :

Publisher :

Page : 570 pages

File Size : 24,29 MB

Release : 1967

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Infinite Dimensional Analysis

Author : Charalambos D. Aliprantis

Publisher :

Page : 624 pages

File Size : 44,29 MB

Release : 2014-01-15

Category :

ISBN : 9783662030059

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Measures on Infinite Dimensional Spaces

Author : Yasuo Yamasaki

Publisher : World Scientific

Page : 276 pages

File Size : 19,65 MB

Release : 1985

Category : Science

ISBN : 9789971978525

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Book Description

This book is based on lectures given at Yale and Kyoto Universities and provides a self-contained detailed exposition of the following subjects: 1) The construction of infinite dimensional measures, 2) Invariance and quasi-invariance of measures under translations. This book furnishes an important tool for the analysis of physical systems with infinite degrees of freedom (such as field theory, statistical physics and field dynamics) by providing material on the foundations of these problems.



Qualitative Properties of a Class of Infinite Dimensional Systems

Author : Herman Felix Vandevenne

Publisher :

Page : 175 pages

File Size : 34,63 MB

Release : 1972

Category : Functional analysis

ISBN :

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The research is concerned with the theory of infinite dimensional systems and their qualitative properties: controllability, observability, stabilizability and other related notions. Such properties may be unstable under approximation, in which case there may exist a property-gap. Considerable use is made of functional analysis, especially spectral theory in deriving several criteria for checking these system properties. As an illustration of the general theory linear systems with hereditary dependence (the most general type known to be useful) are considered. Several new results on controllability and stabilizability are presented. (Author).