E. Nakamura; M. Adachi; Y. Akishige; K. Deguchi; K. Gesi; T. Hikita; T. Ikeda; Y. Makita; M. Mitsui; E. Sawaguchi; Shi Springer-Verlag Berlin and Heidelberg GmbH & Co. KG (1990) Kovakantinen kirja
E. Nakamura; M. Adachi; Y. Akishige; K. Deguchi; J. Harada; T. Ikeda; M. Okuyama; E. Sawaguchi; Y. Shiozaki; K. Toyoda Springer-Verlag Berlin and Heidelberg GmbH & Co. KG (1989) Kovakantinen kirja
Image processing problems are often not well defined because real images are contaminated with noise and other uncertain factors. In Mathematics of Shape Description, the authors take a mathematical approach to address these problems using the morphological and set-theoretic approach to image processing and computer graphics by presenting a simple shape model using two basic shape operators called Minkowski addition and decomposition. This book is ideal for professional researchers and engineers in Information Processing, Image Measurement, Shape Description, Shape Representation and Computer Graphics. Post-graduate and advanced undergraduate students in pure and applied mathematics, computer sciences, robotics and engineering will also benefit from this book. Key Features Explains the fundamental and advanced relationships between algebraic system and shape description through the set-theoretic approachPromotes interaction of image processing geochronology and mathematics in the field of algebraic geometryProvides a shape description scheme that is a notational system for the shape of objectsOffers a thorough and detailed discussion on the mathematical characteristics and significance of the Minkowski operators