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Nonlinear Dimensionality Reduction (Information Science and Statistics) de John A. Lee,Michel Verleysen
Descripción - Críticas From the reviews: 'This beautifully produced book covers various innovative topics in nonlinear dimensionality reduction, such as Isomap, locally linear embedding, and Laplacian eigenmaps, etc. Those topics are usually not covered by existing texts on multivariate statistical techniques. Moreover, the text offers an excellent overview of the concept of intrinsic dimension. Special attention is devoted to the topic of estimation of the intrinsic dimension, which has been previously overlooked by many researchers.… A strong feature of the book is the style of presentation. The book is clearly written, …A large number of examples and graphical displays in color help the reader in understanding the ideas. For each method discussed, the authors do a credible job by starting from motivating examples and intuitive ideas, introducing rigorous mathematical notation without being cumbersome, and ending with discussion and conclusion remarks. All in all, this is an interesting book, and I would recommend this text to those researchers who want to learn quickly about this new field of manifold learning. This book will serve as a useful and necessary resource to several advanced statistics courses in machine learning and data mining.… In addition, the Matlab and R packages will surely enhance the learning resources and increase the accessibility of this book to data analysts. ' (Haonan Wang, Biometrics, June 2009, 65) 'The book by Lee and Verleysen presents a comprehensive summary of the state-of-the-art of the field in a very accessible manner. It is the only book I know that offers such a thorough and systematic account of this interesting and important area of research. … Reading the book is quite enjoyable … .' (Lasse Holmström, International Statistical Reviews, Vol. 76 (2), 2008) 'The book provides an effective guide for selecting the right method and understanding potential pitfalls and limitations of the many alternative methods. … All in all, Nonlinear Dimensionality Reduction may serve two groups of readers differently. To the reader already immersed in the field it is a convenient compilation of a wide variety of algorithms with references to further resources. To students or professionals in areas outside of machine learning or statistics … it can be highly recommended as an introduction.' (Kilian Q. Weinberger, Journal of the American Statistical Association, Vol. 104 (485), March, 2009) Reseña del editor This book reviews well-known methods for reducing the dimensionality of numerical databases as well as recent developments in nonlinear dimensionality reduction. All are described from a unifying point of view, which highlights their respective strengths and shortcomings. Contraportada Methods of dimensionality reduction provide a way to understand and visualize the structure of complex data sets. Traditional methods like principal component analysis and classical metric multidimensional scaling suffer from being based on linear models. Until recently, very few methods were able to reduce the data dimensionality in a nonlinear way. However, since the late nineties, many new methods have been developed and nonlinear dimensionality reduction, also called manifold learning, has become a hot topic. New advances that account for this rapid growth are, e.g. the use of graphs to represent the manifold topology, and the use of new metrics like the geodesic distance. In addition, new optimization schemes, based on kernel techniques and spectral decomposition, have lead to spectral embedding, which encompasses many of the recently developed methods. This book describes existing and advanced methods to reduce the dimensionality of numerical databases. For each method, the description starts from intuitive ideas, develops the necessary mathematical details, and ends by outlining the algorithmic implementation. Methods are compared with each other with the help of different illustrative examples. The purpose of the book is to summarize clear facts and ideas about well-known methods as well as recent developments in the topic of nonlinear dimensionality reduction. With this goal in mind, methods are all described from a unifying point of view, in order to highlight their respective strengths and shortcomings. The book is primarily intended for statisticians, computer scientists and data analysts. It is also accessible to other practitioners having a basic background in statistics and/or computational learning, like psychologists (in psychometry) and economists. John A. Lee is a Postdoctoral Researcher of the Belgian National Fund for Scientific Research (FNRS). He is (co-)author of more than 30 publications in the field of machine learning and dimensionality reduction. Michel Verleysen is Professor at the Université catholique de Louvain (Louvain-la-Neuve, Belgium), and Honorary Research Director of the Belgian National Fund for Scientific Research (FNRS). He is the chairman of the annual European Symposium on Artificial Neural Networks, co-editor of the Neural Processing Letters journal (Springer), and (co-)author of more than 200 scientific publications in the field of machine learning.
Detalles del Libro
- Name: Nonlinear Dimensionality Reduction (Information Science and Statistics)
- Autor: John A. Lee,Michel Verleysen
- Categoria: Libros,Ciencias, tecnología y medicina,Matemáticas
- Tamaño del archivo: 12 MB
- Tipos de archivo: PDF Document
- Descargada: 125 times
- Idioma: Español
- Archivos de estado: AVAILABLE
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Nonlinear dimensionality reduction - Wikipedia ~ Below is a summary of some of the important algorithms from the history of manifold learning and nonlinear dimensionality reduction (NLDR). Many of these non-linear dimensionality reduction methods are related to the linear methods listed below.Non-linear methods can be broadly classified into two groups: those that provide a mapping (either from the high-dimensional space to the low .
Nonlinear Dimensionality Reduction / John A. Lee / Springer ~ Methods of dimensionality reduction provide a way to understand and visualize the structure of complex data sets. Traditional methods like principal component analysis and classical metric multidimensional scaling suffer from being based on linear models. Until recently, very few methods were able
Dimensionality Reduction: A Comparative Review ~ Dimensionality Reduction: A Comparative Review Laurens van der Maaten Eric Postma Jaap van den Herik TiCC, Tilburg University 1 Introduction Real-world data, such as speech signals, digital photographs, or fMRI scans, usually has a high dimen-
NONLINEAR DIMENSIONALITY REDUCTION AS INFORMATION RETRIEVAL ~ Publications in Computer and Information Science Report E5 September 2006 NONLINEAR DIMENSIONALITY REDUCTION AS INFORMATION RETRIEVAL Jarkko Venna Samuel Kaski AB TEKNILLINEN KORKEAKOULU TEKNISKA HÖGSKOLAN HELSINKI UNIVERSITY OF TECHNOLOGY TECHNISCHE UNIVERSITÄT HELSINKI UNIVERSITE DE TECHNOLOGIE D’HELSINKI
Nonlinear Dimensionality Reduction / Springer for Research ~ However, since the late nineties, many new methods have been developed and nonlinear dimensionality reduction, also called manifold learning, has become a hot topic. New advances that account for this rapid growth are, e.g. the use of graphs to represent the manifold topology, and the use of new metrics like the geodesic distance.
Nonlinear dimensionality reduction / Psychology Wiki / Fandom ~ ↑ S. T. Roweis and L. K. Saul, Nonlinear Dimensionality Reduction by Locally Linear Embedding, Science Vol 290, 22 December 2000, 2323–2326. ↑ Mikhail Belkin and Partha Niyogi , Laplacian Eigenmaps and Spectral Techniques for Embedding and Clustering, Advances in Neural Information Processing Systems 14, 2001, p. 586–691, MIT Press
Nonlinear Dimensionality Reduction by Locally Linear Embedding ~ Nonlinear Dimensionality Reduction by Locally Linear Embedding Sam T. Roweis1 and Lawrence K. Saul2 Many areas of science depend on exploratory data analysis and visualization. The need to analyze large amounts of multivariate data raises the fundamental problem of dimensionality reduction: how to discover compact representations of high .
Nonlinear dimensionality reduction (eBook, 2007) [WorldCat ~ Get this from a library! Nonlinear dimensionality reduction. [John A Lee; Michel Verleysen] -- "This book describes existing and advanced methods to reduce the dimensionality of numerical databases. For each method, the description starts from intuitive ideas, develops the necessary .
Nonlinear Dimensionality Reduction of Data by Deep ~ Nonlinear Dimensionality Reduction of Data by Deep Distributed Random Samplings Xiao-Lei Zhang huoshan6@126 Tsinghua National Laboratory for Information Science and Technology, Department of Electronic Engineering, Tsinghua University, Beijing, China, 100084. Editor: Dinh Phung and Hang Li Abstract
High-Dimensional Data / SpringerLink ~ Cite this chapter as: Lee J.A., Verleysen M. (2007) High-Dimensional Data. In: Lee J.A., Verleysen M. (eds) Nonlinear Dimensionality Reduction.
Dimensionality reduction - Wikipedia ~ In statistics, machine learning, and information theory, dimensionality reduction or dimension reduction is the process of reducing the number of random variables under consideration by obtaining a set of principal variables. Approaches can be divided into feature selection and feature extraction.
Information Retrieval Perspective to Nonlinear ~ Nonlinear dimensionality reduction methods are often used to visualize high-dimensional data, al- though the existing methods have been designed for other related tasks such as manifold learning. It has been difficult to assess the quality of visualizations since the task has not been well-defined.
Nonlinear Dimensionality Reduction as Information Retrieval ~ Nonlinear Dimensionality Reduction as Information Retrieval Jarkko Venna and Samuel Kaski Helsinki Institute for Information Technology Laboratory of Computer and Information Science Helsinki University of Technology P.O. Box 5400, FI-02015 TKK, Finland jarkko.venna@tkk.fi, samuel.kaski@tkk.fi Abstract Nonlinear dimensionality reduction has so
Nonlinear Dimensionality Reduction (Information Science ~ Nonlinear Dimensionality Reduction (Information Science and Statistics) - Kindle edition by Lee, John A., Verleysen, Michel. Download it once and read it on your Kindle device, PC, phones or tablets. Use features like bookmarks, note taking and highlighting while reading Nonlinear Dimensionality Reduction (Information Science and Statistics).
Nonlinear Dimensionality Reduction (Information Science ~ Nonlinear Dimensionality Reduction (Information Science and Statistics) [Lee, John A., Verleysen, Michel] on . *FREE* shipping on qualifying offers. Nonlinear Dimensionality Reduction (Information Science and Statistics)
Dimensionality Reduction - an overview / ScienceDirect Topics ~ 6.5. Dimensionality reduction using SVD: Write a MATLAB function named SVD_eval that evaluates the performance of the SVD method when applied on a data matrix X.More specifically, this function takes as inputs: (a) an l × N dimensional matrix X, whose columns contain the data vectors, (b) the dimensionality k(l) of the reduced space (k-dimensional hyperplane), h, generated by the k column .
Information Retrieval Perspective to Nonlinear Dimensionality ~ Information Retrieval Perspective to Nonlinear Dimensionality - Free download as PDF File (.pdf), Text File (.txt) or read online for free. Journal of Machine Learning Research 11 (2010) 451-490 Submitted 4/09; Revised 12/09; Published 2/10 Information Retrieval Perspective to Nonlinear Dimensionality Reduction for Data Visualization Jarkko Venna Jaakko Peltonen Kristian Nybo Helena Aidos .
Nonlinear Dimensionality Reduction by Locally - Science ~ Many areas of science depend on exploratory data analysis and visualization. The need to analyze large amounts of multivariate data raises the fundamental problem of dimensionality reduction: how to discover compact representations of high-dimensional data. Here, we introduce locally linear embedding (LLE), an unsupervised learning algorithm that computes low-dimensional, neighborhood .
(PDF) Information Retrieval Perspective to Nonlinear ~ Nonlinear dimensionality reduction methods are often used to visualize high-dimensional data, . Department of Information and Computer Science. P.O. Box 15400, FI-00076 Aalto, F inland.
Nonlinear Dimensionality Reduction - John A. Lee, Michel ~ Methods of dimensionality reduction provide a way to understand and visualize the structure of complex data sets. Traditional methods like principal component analysis and classical metric multidimensional scaling suffer from being based on linear models. Until recently, very few methods were able to reduce the data dimensionality in a nonlinear way.
(PDF) Nonlinear Dimensionality Reduction on Graphs ~ The present paper puts forth a nonlinear dimensionality reduction framework that accounts for data lying on known graphs. . Statistics and Actuarial Science, Univ. of Waterloo, Ontario, Canada,
Nonlinear Dimensionality Reduction (Information Science ~ Buy Nonlinear Dimensionality Reduction (Information Science and Statistics) 2007 by John A. Lee, Michel Verleysen (ISBN: 9780387393506) from 's Book Store. Everyday low prices and free delivery on eligible orders.
Nonlinear dimensionality reduction viewed as information ~ Nonlinear dimensionality reduction viewed as information retrieval Jarkko Venna Samuel Kaski Helsinki Institute for Information Technology Laboratory of Computer and Information Science Helsinki University of Technology P.O. Box 5400, FI-02015 TKK, FINLAND jarkko.venna@tkk.fi, samuel.kaski@tkk.fi 1 Introduction
[1805.05502] Nonlinear Dimensionality Reduction for ~ Principal component analysis (PCA) is widely used for feature extraction and dimensionality reduction, with documented merits in diverse tasks involving high-dimensional data. Standard PCA copes with one dataset at a time, but it is challenged when it comes to analyzing multiple datasets jointly. In certain data science settings however, one is often interested in extracting the most .
Nonlinear Dimensionality Reduction for Discriminative ~ Nonlinear Dimensionality Reduction for Discriminative Analytics of Multiple Datasets Jia Chen, Gang Wang, Member, IEEE, and Georgios B. Giannakis, Fellow, IEEE Abstract—Principal component analysis (PCA) is widely used for feature extraction and dimensionality reduction, with docu-mented merits in diverse tasks involving high-dimensional data.