Riemannian Computing in Computer Vision

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129,98 

ISBN: 3319360957
ISBN 13: 9783319360959
Herausgeber: Pavan K Turaga/Anuj Srivastava
Verlag: Springer Verlag GmbH
Umfang: vi, 391 S., 22 s/w Illustr., 66 farbige Illustr., 391 p. 88 illus., 66 illus. in color.
Erscheinungsdatum: 23.08.2016
Auflage: 1/2016
Produktform: Kartoniert
Einband: Kartoniert

This book presents a comprehensive treatise on Riemannian geometric computations and related statistical inferences in several computer vision problems. This edited volume includes chapter contributions from leading figures in the field of computer vision who are applying Riemannian geometric approaches in problems such as face recognition, activity recognition, object detection, biomedical image analysis, and structure-from-motion. Some of the mathematical entities that necessitate a geometric analysis include rotation matrices (e.g. in modeling camera motion), stick figures (e.g. for activity recognition), subspace comparisons (e.g. in face recognition), symmetric positive-definite matrices (e.g. in diffusion tensor imaging), and function-spaces (e.g. in studying shapes of closed contours). ·         Illustrates Riemannian computing theory on applications in computer vision, machine learning, and robotics·         Emphasis on algorithmic advances that will allow re-application in other contexts·         Written by leading researchers in computer vision and Riemannian computing, from universities and industry

Artikelnummer: 2874127 Kategorie:

Beschreibung

This book presents a comprehensive treatise on Riemannian geometric computations and related statistical inferences in several computer vision problems. This edited volume includes chapter contributions from leading figures in the field of computer vision who are applying Riemannian geometric approaches in problems such as face recognition, activity recognition, object detection, biomedical image analysis, and structure-from-motion. Some of the mathematical entities that necessitate a geometric analysis include rotation matrices (e.g. in modeling camera motion), stick figures (e.g. for activity recognition), subspace comparisons (e.g. in face recognition), symmetric positive-definite matrices (e.g. in diffusion tensor imaging), and function-spaces (e.g. in studying shapes of closed contours).

Autorenporträt

Pavan Turaga is an Assistant Professor at Arizona State University Anuj Srivastava is a Professor at Florida State University

Herstellerkennzeichnung:


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E-Mail: juergen.hartmann@springer.com

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