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新書推薦： 《 南宋行暮：宋光宗宋宁宗时代（增订本） 》 售價：NT$ 458.0 《 算力芯片——高性能 CPU/GPU/NPU 微架构分析 》 售價：NT$ 671.0 《 漫长的调查：重走营造学社川康古建筑调查之路 》 售價：NT$ 406.0 《 历史的温度1-7（典藏版套装全7册） 》 售價：NT$ 3110.0 《 如何建立适合自己的交易系统（一本金融初学者建立交易系统的实用工具书） 》 售價：NT$ 302.0 《 中国古代文体学研究（中华学术·有道 精装） 》 售價：NT$ 770.0 《 美器：中国古代物质文化九讲 》 售價：NT$ 874.0 《 谜托邦：故事新编 》 售價：NT$ 411.0

建議一齊購買： + NT$ 549 《 变分法和最优控制论 》 + NT$ 361 《 变分法 第四版 》 + NT$ 466 《 变分学讲义 》 內容簡介： Imagmg is an interdisciplinary research area with profound applications in many areas of science， engineering， technology， and medicine. The most primitrve form of imaging is visual in，spection， which has dominated the area before the technical and computer revolution era. Today， computer imaging covers various aspects of data tiltering， pattern recognition， feature extraction.， co''mputer aided mspection， and medical diagnosis. The above mentioned areas are treated in different scientific communities such as Imagin，g， In，verse Problems， Computer Vision， Signal and Image Processing，…， but all share the common thread of recovery of an object or one of its properties. 目錄： Part I Fundamentals of Imagmg 1 Case Examples of Imaging 1.1 Denoising 1.2 Chopping and Nodding 1.3 Image Inpainting 1.4 X-ray-Based Computerized Tomography 1.5 Thermoacoustic Computerzed Tomography 1.6 Schlieren Tomography 2 Image and Noise Models 2.1 Basic Concepts of Statistics 2.2 Digitzed （Discrete） Images 2.3 Noise Models 2.4 Priors for Images 2.5 Maximum A Posteriori Estimation 2.6 MAP Rstimation for Noisy Images Part II Regularization 3 Variational R,egularzation Methods for the Solution of Inverse Problems 3.1 Quadratic Tikhonov R;egularization in Hilbert Spaces 3.2 Variational R,egularization Methods in Banach Spaces 3.3 Regularization with Sparsity Constraints 3.4 Linear Inverse Problems with Convex Constraints 3.5 Schlieren Tomography. 3.6 Further Literature on Regularization Methods for Inverse Problems 4 Convex Regularization Methods for Denoising 4.1 The Number 4.2 Characterization of Minimizers 4.3 One-dimensional Results 4.4 Taut String Algorithm 4.5 Mumford-Shah Regularization 4.6 Recent Topics on Denoising with Variational Methods 5 Variational Calculus for Non-convex R,egularization 5.1 Direct Methods 5.2 Relaxation on Sobolev Spaces 5.3 Relaxation on BV 5.4 Applications in Non-convex Regularization 5.5 One-dimensional Results 5.6 Examples 6 Serru-group Theory and Scale Spaces 6.1 Linear Semi-group Theory 6.2 Non-linear Semi-groups in Hilbert Spaces 6.3 Non-Iinear Semi-groups in Banach Spaces 6.4 Axiomatic Approach to Scale Spaces 6.5 Evolution by Non-convex Energy Functionals 6.6 Enhancing 7 Inverse Scale Spaces 7.1 Iterative Tikhonov Regularization 7.2 Iterative Regularization with Bregman Distances 7.3Recent Topics on Evolutionary Equations for Inverse Problems Part III Mathematical Foundations 8 Functional Analysis 8.1 General Topology 8.2 Locally Convex Spaces 8.3 Bounded Linear Operators and Functionals 8.4 Linear Operators in Hilbert Spaces 8.5 Weak and Weak Topologies 8.6 Spaces of Differentiable Functions 9 Weakly Differentiable Functions 9.1 Measure and Integration Theory 9.2 Distributions and Distributional Derivatives 9.3 Geometrical Properties of Functions and Domains 9.4 Sobolev Spaces 10 Convex Analysis and Calculus of Variations References Nomenclature Index

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