TY - BOOK AU - Bronstein,Alexander M. AU - Bronstein,Michael M. AU - Kimmel,Ron ED - SpringerLink (Online service) TI - Numerical Geometry of Non-Rigid Shapes T2 - Monographs in Computer Science, SN - 9780387733012 PY - 2009/// CY - New York, NY PB - Springer New York KW - Computer science KW - Computer vision KW - Mathematics KW - Geometry KW - Computer Science KW - Computer Imaging, Vision, Pattern Recognition and Graphics KW - Computational Mathematics and Numerical Analysis N1 - A Taste of Geometry -- Discrete Geometry -- Shortest Paths and Fast Marching Methods -- Numerical Optimization -- In the Rigid Kingdom -- Multidimensional Scaling -- Spectral Embedding -- Non Euclidean Embedding -- Isometry Invariant Similarity -- Partial Similarity -- Non rigid Correspondence and Calculus of Shapes -- Three dimensional Face Recognition -- Epilogue N2 - Deformable objects are ubiquitous in the world surrounding us, on all levels from micro to macro. The need to study such shapes and model their behavior arises in a wide spectrum of applications, ranging from medicine to security. In recent years, non-rigid shapes have attracted growing interest, which has led to rapid development of the field, where state-of-the-art results from very different sciences - theoretical and numerical geometry, optimization, linear algebra, graph theory, machine learning and computer graphics, to mention several - are applied to find solutions. This book gives an overview of the current state of science in analysis and synthesis of non-rigid shapes. Everyday examples are used to explain concepts and to illustrate different techniques. The presentation unfolds systematically and numerous figures enrich the engaging exposition. Practice problems follow at the end of each chapter, with detailed solutions to selected problems in the appendix. A gallery of colored images enhances the text. This book will be of interest to graduate students, researchers and professionals in different fields of mathematics, computer science and engineering. It may be used for courses in computer vision, numerical geometry and geometric modeling and computer graphics or for self-study UR - http://dx.doi.org/10.1007/978-0-387-73301-2 ER -