This book provides a comprehensive introduction to the latest advances in the mathematical theory and computational tools for modeling high-dimensional data drawn from one or multiple low-dimensional subspaces (or manifolds) and potentially corrupted by noise, gross errors, or outliers. This challenging task requires the development of new algebraic, geometric, statistical, and computational methods for efficient and robust estimation and segmentation of one or multiple subspaces. The book also presents interesting real-world applications of these new methods in image processing, image and video segmentation, face recognition and clustering, and hybrid system identification etc. This book is intended to serve as a textbook for graduate stud...
Principal components analysis (PCA) is a well-known technique for approximating a data set represent...
In this paper, we propose a general dimensionality reduction method for data generated from a very b...
This paper mainly focuses on the principle component analysis (PCA) and its applications on vision b...
In recent years, subspace arrangements have become an increasingly popular class of mathematical obj...
Principal component analysis is a versatile statistical method for reducing a cases-by-variables da...
Generalised Principal Component Analysis (GPCA) is a recently devised technique for fitting a multi-...
In 1901, Karl Pearson invented Principal Component Analysis (PCA). Since then, PCA serves as a proto...
The problem of approximating multidimensional data with objects of lower dimension is a classical pr...
Recent years have witnessed an explosion of data across scientific fields enabled by advances in sen...
Principal component analysis (PCA) is one of the most important dimension reduction technique. It is...
Generalised Principal Component Analysis (GPCA) is a recently devised technique for fitting a multi-...
The objectives of this research are to analyze and develop a modified Principal Component Analysis (...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
Principal component analysis (PCA), also known as proper orthogonal decomposition or Karhunen-Loeve ...
Principal components analysis (PCA) is a well-known technique for approximating a data set represent...
In this paper, we propose a general dimensionality reduction method for data generated from a very b...
This paper mainly focuses on the principle component analysis (PCA) and its applications on vision b...
In recent years, subspace arrangements have become an increasingly popular class of mathematical obj...
Principal component analysis is a versatile statistical method for reducing a cases-by-variables da...
Generalised Principal Component Analysis (GPCA) is a recently devised technique for fitting a multi-...
In 1901, Karl Pearson invented Principal Component Analysis (PCA). Since then, PCA serves as a proto...
The problem of approximating multidimensional data with objects of lower dimension is a classical pr...
Recent years have witnessed an explosion of data across scientific fields enabled by advances in sen...
Principal component analysis (PCA) is one of the most important dimension reduction technique. It is...
Generalised Principal Component Analysis (GPCA) is a recently devised technique for fitting a multi-...
The objectives of this research are to analyze and develop a modified Principal Component Analysis (...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
Principal component analysis (PCA), also known as proper orthogonal decomposition or Karhunen-Loeve ...
Principal components analysis (PCA) is a well-known technique for approximating a data set represent...
In this paper, we propose a general dimensionality reduction method for data generated from a very b...
This paper mainly focuses on the principle component analysis (PCA) and its applications on vision b...