Algorithmic advances in Riemannian geometry and applications : for machine learning, computer vision, statistics, and optimization / edited by Hà Quang Minh, Vittorio Murino.
Material type: TextSeries: Advances in Computer Vision and Pattern RecognitionPublisher: Cham : Springer International Publishing : Imprint: Springer, 2016Edition: 2016Description: xiv, 208 pages : 55 illustrations. 24 cmISBN:- 9783319831909
- Artificial intelligence
- Computational intelligence
- Computer mathematics
- Computer science-Mathematics
- Mathematical statistics
- Pattern recognition
- Statistics
- Pattern Recognition
- Artificial Intelligence
- Computational Intelligence
- Mathematical Applications in Computer Science
- Probability and Statistics in Computer Science
- Statistics and Computing/Statistics Programs
- 516.373 MIN 23
Item type | Current library | Call number | Status | Date due | Barcode | |
---|---|---|---|---|---|---|
Standard Loan | Moylish Library Main Collection | 516.373 MIN (Browse shelf(Opens below)) | Available | 39002100608661 |
Enhanced descriptions from Syndetics:
This book presents a selection of the most recent algorithmic advances in Riemannian geometry in the context of machine learning, statistics, optimization, computer vision, and related fields. The unifying theme of the different chapters in the book is the exploitation of the geometry of data using the mathematical machinery of Riemannian geometry. As demonstrated by all the chapters in the book, when the data is intrinsically non-Euclidean, the utilization of this geometrical information can lead to better algorithms that can capture more accurately the structures inherent in the data, leading ultimately to better empirical performance. This book is not intended to be an encyclopedic compilation of the applications of Riemannian geometry. Instead, it focuses on several important research directions that are currently actively pursued by researchers in the field. These include statistical modeling and analysis on manifolds,optimization on manifolds, Riemannian manifolds and kernel methods, and dictionary learning and sparse coding on manifolds. Examples of applications include novel algorithms for Monte Carlo sampling and Gaussian Mixture Model fitting, 3D brain image analysis,image classification, action recognition, and motion tracking.
This book presents a selection of the most recent algorithmic advances in Riemannian geometry in the context of machine learning, statistics, optimization, computer vision, and related fields. The unifying theme of the different chapters in the book is the exploitation of the geometry of data using the mathematical machinery of Riemannian geometry. As demonstrated by all the chapters in the book, when the data is intrinsically non-Euclidean, the utilization of this geometrical information can lead to better algorithms that can capture more accurately the structures inherent in the data, leading ultimately to better empirical performance. This book is not intended to be an encyclopedic compilation of the applications of Riemannian geometry. Instead, it focuses on several important research directions that are currently actively pursued by researchers in the field. These include statistical modeling and analysis on manifolds,optimization on manifolds, Riemannian manifolds and kernel methods, and dictionary learning and sparse coding on manifolds. Examples of applications include novel algorithms for Monte Carlo sampling and Gaussian Mixture Model fitting, 3D brain image analysis,image classification, action recognition, and motion tracking.
Description based on publisher-supplied MARC data.
Author notes provided by Syndetics
Dr. Hà Quang Minh is a researcher in the Pattern Analysis and Computer Vision (PAVIS) group, at the Italian Institute of Technology (IIT), in Genoa, Italy.
Dr. Vittorio Murino is a full professor at the University of Verona Department of Computer Science, and the Director of the PAVIS group at the IIT.