Buch, Englisch, 254 Seiten, Format (B × H): 160 mm x 241 mm, Gewicht: 619 g
Buch, Englisch, 254 Seiten, Format (B × H): 160 mm x 241 mm, Gewicht: 619 g
Reihe: Signals and Communication Technology
ISBN: 978-981-10-7271-0
Verlag: Springer Nature Singapore
This book provides an introduction to image processing, an overview of the transforms which are most widely used in the field of image processing, and an introduction to the application of multiscale transforms in image processing.
The book is divided into three parts, with the first part offering the reader a basic introduction to image processing. The second part of the book starts with a chapter on Fourier analysis and Fourier transforms, wavelet analysis, and ends with a chapter on new multiscale transforms. The final part of the book deals with all of the most important applications of multiscale transforms in image processing.
The chapters consist of both tutorial and highly advanced material, and as such the book is intended to be a reference text for graduate students and researchers to obtain state-of-the-art knowledge on specific applications. The technique of solving problems in the transform domain is common in applied mathematics and widely used in research and industry, but is a somewhat neglected subject within the undergraduate curriculum. It is hoped that faculty can use this book to create a course that can be offered early in the curriculum and fill this void. Also, the book is intended to be used as a reference manual for scientists who are engaged in image processing research, developers of image processing hardware and software systems, and practising engineers and scientists who use image processing as a tool in their applications.
Zielgruppe
Graduate
Autoren/Hrsg.
Fachgebiete
Weitere Infos & Material
I Introduction to Image Processing. 1 Fundamentals of Digital Image Processing. 1.1 Image Acquisition of Digital Camera. 1.1.1 Introduction. 1.2 Sampling. References.
II Multiscale Transform.2 Fourier Analysis and Fourier Transform. 2.1 Overview. 2.2 Fourier Series. 2.2.1 Periodic Functions. 2.2.2 Frequency and Amplitude. 2.2.3 Phase. 2.2.4 Fourier Series of Periodic Functions. 2.2.5 Complex form of Fourier Series. 2.3 Fourier Transform. 2.3.1 2D-Fourier Transform. 2.3.2 Properties of Fourier Transform. 2.4 Discrete Fourier Transform. 2.4.1 1D-Discrete Fourier Transform. 2.4.2 Inverse 1D-Discrete Fourier Transform. 2.4.3 2D-Discrete Fourier Transform and 2D-Inverse Discrete Fourier Transform. 2.4.4 Properties of 2D-Discrete Fourier transform. 2.5 Fast Fourier Transform. 2.6 The Discrete Cosine Transform. 2.6.1 1D-Discrete Cosine Transform. 2.6.2 2D-Discrete Cosine Transform. 2.7 Heisenberg Uncertainty Principle. 2.8 Windowed Fourier Transform or Short-Time Fourier Transform. 2.8.1 1D and 2D Short-Time Fourier Transform. 2.8.2 Drawback of Short-Time Fourier Transform. 2.9 Other Spectral Transforms. References
3 Wavelets and Wavelet Transform. 3.1 Overview. 3.2 Wavelets. 3.3 Multiresolution Analysis. 3.4 Wavelet Transform. 3.4.1 The Wavelet Series Expansions. 3.4.2 Discrete Wavelet Transform. 3.4.3 Motivation: From MRA to Discrete Wavelet Transform. 3.4.4 The Quadrature Mirror Filter Conditions. 3.5 The Fast Wavelet Transform. 3.6 Why Use Wavelet. Transforms. 3.7 Two-Dimensional Wavelets. 3.8 2D-discrete Wavelet Transform. 3.9 Continuous Wavelet Transform. 3.9.1 1D Continuous Wavelet Transform. 3.9.2 2D Continuous Wavelet Transform. 3.10 Undecimated Wavelet Transform or Stationary Wavelet Transform. 3.11 Biorthogonal Wavelet Transform. 3.11.1 Linear Independence and Biorthogonality. 3.11.2 Dual MRA. 3.11.3 Discrete Transform for Biorthogonal Wavelets. 3.12 Scarcity of Wavelet Transform. 3.13 Complex Wavelet Transform. 3.14 Dual-Tree Complex Wavelet Transform. 3.15 Quaternion Wavelet and Quaternion Wavelet. Transform. 3.15.1 2D Hilbert Trnasform 3.15.2 Quaternion Algebra. 3.15.3 Quaternion Multiresolution Analysis. References.
4 New Multiscale Constructions. 4.1 Overview. 4.2 Ridgelet Transform. 4.2.1 The Continuous Ridgelet Transform. 4.2.2 Discrete Ridgelet Transform. 4.2.3 The Orthonormal Finite Ridgelet Transform. 4.2.4 The Fast Slant Stack Ridgelet Transform. 4.2.5 Local Ridgelet Transform. 4.2.6 Sparse Representation by Ridgelets. 4.3 Curvelets. 4.3.1 The First Generation Curvelet Transform .4.3.2 Sparse Representation by First Generation Curvelets. 4.3.3 The Second-Generation Curvelet Transform. 4.3.4 Sparse Representation by Second Generation Curvelets. 4.4 Contourlet. 4.5 Contourlet Transform. 4.5.1 Multiscale Decomposition. 4.5.2 Directional Decomposition. 4.5.3 The Discrete Contourlet Transform. 4.6 Shearlet. 4.7 Shearlet Transform. 4.7.1 Continuous Shearlet Transform. 4.7.2 Discrete Shearlet Transform. 4.7.3 Cone-Adapted Continuous Shearlet Transform. 4.7.4 Cone-Adapted Discrete Shearlet Transform. 4.7.5 Compactly Supported Shearlets. 4.7.6 Sparse Representation by Shearlets. References.
III Application of Multiscale transforms to Image Processing5 Image Restoration. 5.1 Model of image degradation and restoration process. 5.2 Image Quality Assessments Metrics. 5.3 Image Denoising. 5.4 Noise Models. 5.4.1 Additive Noise Model. 5.4.2 Multiplicative Noise Model. 5.5 Types of Noise. 5.5.1 Amplier(Gaussian) Noise. 5.5.2 Rayleigh Noise. 5.5.3 Uniform Noise. 5.5.4 Impulsive(Salt and Pepper) Noise. 5.5.5 Exponential Noise. 5.5.6 Speckle Noise. 5.6 Image Deblurring. 5.6.1 Gaussian Blur. 5.6.2 Motion Blur. 5.6.3 Rectangular Blur. 5.6.4 Defocus Blur. 5.7 Superresolution. 5.8 Classication of Image Restoration Algorithms. 5.8.1 Spatial Filtering. 5.8.2 Frequency Domain Filtering. 5.8.3 Direct Inverse Filtering. 5.8.4 Constraint Least-Square Filter. 5.8.5 IBD (Iterative Blind Deconvolution). 5.8.6 NAS-RIF (Nonnegative and Support Constraints Recursive InverseFiltering). 5.8.7 Superresolution Restoration Algorithm Based on Gradient Adaptive Interpolation. 5.8.8 Deconvolution Using a Sparse Prior. 5.8.9 Block-matching. 5.8.10 LPA-ICI algorithm. 5.8.11 Deconvolution using Regularized Filter (DRF). 5.8.12 Lucy-Richardson Algorithm. 5.8.13 Neural Network Approach. 5.9 Application of Multiscale Transform in Image Restoration. 5.9.1 Image Restoration using Wavelet Transform. 5.9.2 Image Restoration using Complex Wavelet Transform. 5.9.3 Image Restoration using Quaternion Wavelet Transform. 5.9.4 Image Restoration using Ridgelet Transform. 5.9.5 Image Restoration using Curvelet Transform. 5.9.6 Image Restoration using Contourlet Transform. 5.9.7 Image Restoration using Shearlet Transform. References.
6 Image Enhancement. 6.1 Overview. 6.2 Spatial Domain Image Enhancement Techniques. 6.2.1 Gray Level Transformation. 6.2.2 Piecewise-Linear Transformation Functions. 6.2.3 Histogram Processing. 6.2.4 Spatial Filtering. 6.3 Frequency Domain Image Enhancement Techniques. 6.3.1 Smoothing Filters. 6.3.2 Sharpening Filters. 6.3.3 Homomorphic Filtering. 6.4 Colour Image Enhancement. 6.5 Application of Multiscale Transforms in Image Enhancement. 6.5.1 Image Enhancement using Fourier Transform. 6.5.2 Image Enhancement using Wavelet Transform. 6.5.3 Image Enhancement using Complex Wavelet Transform. 6.5.4 Image Enhancement using Curvelet transform. 6.5.5 Image Enhancement using Contourlet transform. 6.5.6 Image Enhancement using Shearlet transform. References.
Appendix A Real and Complex Number System.
Appendix B Vector Space.
Appendix C Linear Transformation, Matrices.
Appendix D Inner Product Space and Orthonormal Basis.
Appendix E Functions and Convergence. E.1 Functions. E.2 Convergence of Functions.
Index.
