点击选择搜索分类
首页 - 港台图书- 正文
☆☆☆☆☆
||
[芬] 凯皮奥(Kaipio J.) 著
出版社: 世界图书出版公司 ISBN:9787510086311 版次:1 商品编码:11647753 包装:平装 外文名称:Statistical and Computational Inverse Problems 开本:24开 出版时间:2015-01-01 用纸:胶版纸 页数:339 正文语种:英文
There is rich literature, including numerous textbooks, on the classical aspects of inverse problems. From the numerical point of view, these books concentrate on problems in which the measurement errors are either very small or in,which the error properties are known exactly. In real world problems, however, the errors are seldom very small and their properties in the deterministic sense are not well known. For example, in classical literature the error norm is usually assumed to be a known real number. In reality, the error norm is a random variable whose mean might be known.
1 Inverse Problems and Interpretation of Measurements
1.1 Introductory Examples
1.2 Inverse Crimes
2 Classical Regularization Methods
2.1 Introduction: Fredholm Equation
2.2 Truncated Singular Value Decomposition
2.3 Tikhonov Regularization
2.3.1 Generalizations of the Tikhonov Regularization
2.4 Regularization by Truncated Iterative Methods
2.4.1 Landweber-Fridman Iteration
2.4.2 Kaczmarz Iteration and ART
2.4.3 Krylov Subspace Methods
2.5 Notes and Comments
3 Statistical Inversion Theory
3.1 Inverse Problems and Bayes' Formula
3.1.1 Estimators
3.2 Construction of the Likelihood Function
3.2.1 Additive Noise
3.2.2 Other Explicit Noise Models
3.2.3 Counting Process Data
3.3 Prior Models
3.3.1 Gaussian Priors
3.3.2 Impulse Prior Densities
3.3.3 Discontinuities
3.3.4 Markov Random Fields
3.3.5 Sample-based Densities
3.4 Gaussian Densities
3.4.1 Gaussian Smoothness Priors
3.5 Interpreting the Posterior Distribution
3.6 Markov Chain Monte Carlo Methods
3.6.1 The Basic Idea
3.6.2 Metropolis-Hastings Construction of the Kernel
3.6.3 Gibbs Sampler
3.6.4 Convergence
3.7 Hierarcical Models
3.8 Notes and Comments
4 Nonstationary Inverse Problems
4.1 Bayesian Filtering
4.1.1 A Nonstationary Inverse Problem
4.1.2 Evolution and Observation Models
4.2 Kalman Filters
4.2.1 Linear Gaussian Problems
4.2.2 Extended Kalman Filters
4.3 Particle Filters
4.4 Spatial Priors
4.5 Fixed-lag and Fixed-interval Smoothing
4.6 Higher-order Markov Models
4.7 Notes and Comments
5 Classical Methods Revisited
5.1 Estimation Theory
5.1.1 Maximum Likelihood Estimation
5.1.2 Estimators Induced by Bayes Costs
5.1.3 Estimation Error with Affine Estimators
5.2 Test Cases
5.2.1 Prior Distributions
5.2.2 Observation Operators
5.2.3 The Additive Noise Models
5.2.4 Test Problems
5.3 Sample-Based Error Analysis
5.4 Truncated Singular Value Decomposition
5.5 Conjugate Gradient.Iteration
5.6 Tikhonov Regularization
5.6.1 Prior Structure and Regularization Level
5.6.2 Misspeeification of the Gaussian Observation Error Model
5.6.3 Additive Cauchy Errors
5.7 Diseretization and Prior Models
5.8 Statistical Model Reduction, Approximation Errors and Inverse Crimes
5.8.1 An Example: Full Angle Tomography and CGNE
5.9 Notes and Comments
6 Model Problems
6.1 X-ray Tomography
6.1.1 Radon Transform
6.1.2 Discrete Model
6.2 Inverse Source Problems
6.2.1 Quasi-static Maxwell's Equations
6.2.2 Electric Inverse Source Problems
6.2.3 Magnetic Inverse Source Problems
6.3 Impedance Tomography
6.4 Optical Tomography
6.4.1 The Radiation Transfer Equation
6.4.2 Diffusion Approximation
6.4.3 Time-harmonic Measurement
6.5 Notes and Comments
7 Case Studies
7.1 Image Deblurring and Recovery of Anomalies
7.1.1 The Model Problem
7.1.2 Reduced and Approximation Error Models
7.1.3 Sampling the Posterior Distribution
7.1.4 Effects of Modelling Errors
7.2 Limited Angle Tomography: Dental X-ray Imaging
7.2.1 The Layer Estimation
7.2.2 MAP Estimates
7.2.3 Sampling: Gibbs Sampler
7.3 Biomagnetic Inverse Problem: Source Localization
7.3.1 Reconstruction with Gaussian White Noise Prior Model
7.3.2 Reconstruction of Dipole Strengths with the e1-prior Model
7.4 Dynamic MEG by Bayes Filtering
7.4.1 A Single Dipole Model
7.4.2 More Realistic Geometry
7.4.3 Multiple Dipole Models
7.5 Electrical Impedance Tomography: Optimal Current Patterns
7.5.1 A Posteriori Synthesized Current Patterns
7.5.2 Optimization Criterion
7.5.3 Numerical Examples
7.6 Electrical Impedance Tomography: Handling Approximation Errors
7.6.1 Meshes and Projectors
7.6.2 The Prior Distribution and the Prior Model
7.6.3 The Enhanced Error Model
7.6.4 The MAP Estimates
7.7 Electrical Impedance Process Tomography
7.7.1 The Evolution Model
7.7.2 The Observation Model and the Computational Scheme
7.7.3 The Fixed-lag State Estimate
7.7.4 Estimation of the Flow Profile
7.8 Optical Tomography in Anisotropic Media
7.8.1 The Anisotropy Model
7.8.2 Linearized Model
7.9 Optical Tomography: Boundary Recovery
7.9.1 The General Elliptic Case
7.9.2 Application to Optical Diffusion Tomography
7.10 Notes and Comments
A Appendix: Linear Algebra and Functional Analysis
A.1 Linear Algebra
A.2 Functional Analysis
A.3 Sobolev Spaces
B Appendix 2: Basics on Probability
B.1 Basic Concepts
B.2 Conditional Probabilities
References
Index
统计和计算逆问题 [Statistical and Computational Inverse Problems] 电子书 下载 mobi epub pdf txt
统计和计算逆问题 [Statistical and Computational Inverse Problems]-so88
统计和计算逆问题 [Statistical and Computational Inverse Problems] pdf epub mobi txt 电子书 下载 2022
图书介绍
☆☆☆☆☆
||
[芬] 凯皮奥(Kaipio J.) 著
出版社: 世界图书出版公司 ISBN:9787510086311 版次:1 商品编码:11647753 包装:平装 外文名称:Statistical and Computational Inverse Problems 开本:24开 出版时间:2015-01-01 用纸:胶版纸 页数:339 正文语种:英文
内容简介
This book is aimed at postgraduate students in applied mathematics as well as at engineering and physics students with a firm background in mathematics. The first four chapters can be used as the material for a first course on inverse problems with a focus on computational and statistical aspects. On the other hand, Chapters 3 and 4, which discuss statistical and nonstationary inversion methods, can be used by students already having knowldege of classical inversion methods.There is rich literature, including numerous textbooks, on the classical aspects of inverse problems. From the numerical point of view, these books concentrate on problems in which the measurement errors are either very small or in,which the error properties are known exactly. In real world problems, however, the errors are seldom very small and their properties in the deterministic sense are not well known. For example, in classical literature the error norm is usually assumed to be a known real number. In reality, the error norm is a random variable whose mean might be known.
内页插图
目录
Preface1 Inverse Problems and Interpretation of Measurements
1.1 Introductory Examples
1.2 Inverse Crimes
2 Classical Regularization Methods
2.1 Introduction: Fredholm Equation
2.2 Truncated Singular Value Decomposition
2.3 Tikhonov Regularization
2.3.1 Generalizations of the Tikhonov Regularization
2.4 Regularization by Truncated Iterative Methods
2.4.1 Landweber-Fridman Iteration
2.4.2 Kaczmarz Iteration and ART
2.4.3 Krylov Subspace Methods
2.5 Notes and Comments
3 Statistical Inversion Theory
3.1 Inverse Problems and Bayes' Formula
3.1.1 Estimators
3.2 Construction of the Likelihood Function
3.2.1 Additive Noise
3.2.2 Other Explicit Noise Models
3.2.3 Counting Process Data
3.3 Prior Models
3.3.1 Gaussian Priors
3.3.2 Impulse Prior Densities
3.3.3 Discontinuities
3.3.4 Markov Random Fields
3.3.5 Sample-based Densities
3.4 Gaussian Densities
3.4.1 Gaussian Smoothness Priors
3.5 Interpreting the Posterior Distribution
3.6 Markov Chain Monte Carlo Methods
3.6.1 The Basic Idea
3.6.2 Metropolis-Hastings Construction of the Kernel
3.6.3 Gibbs Sampler
3.6.4 Convergence
3.7 Hierarcical Models
3.8 Notes and Comments
4 Nonstationary Inverse Problems
4.1 Bayesian Filtering
4.1.1 A Nonstationary Inverse Problem
4.1.2 Evolution and Observation Models
4.2 Kalman Filters
4.2.1 Linear Gaussian Problems
4.2.2 Extended Kalman Filters
4.3 Particle Filters
4.4 Spatial Priors
4.5 Fixed-lag and Fixed-interval Smoothing
4.6 Higher-order Markov Models
4.7 Notes and Comments
5 Classical Methods Revisited
5.1 Estimation Theory
5.1.1 Maximum Likelihood Estimation
5.1.2 Estimators Induced by Bayes Costs
5.1.3 Estimation Error with Affine Estimators
5.2 Test Cases
5.2.1 Prior Distributions
5.2.2 Observation Operators
5.2.3 The Additive Noise Models
5.2.4 Test Problems
5.3 Sample-Based Error Analysis
5.4 Truncated Singular Value Decomposition
5.5 Conjugate Gradient.Iteration
5.6 Tikhonov Regularization
5.6.1 Prior Structure and Regularization Level
5.6.2 Misspeeification of the Gaussian Observation Error Model
5.6.3 Additive Cauchy Errors
5.7 Diseretization and Prior Models
5.8 Statistical Model Reduction, Approximation Errors and Inverse Crimes
5.8.1 An Example: Full Angle Tomography and CGNE
5.9 Notes and Comments
6 Model Problems
6.1 X-ray Tomography
6.1.1 Radon Transform
6.1.2 Discrete Model
6.2 Inverse Source Problems
6.2.1 Quasi-static Maxwell's Equations
6.2.2 Electric Inverse Source Problems
6.2.3 Magnetic Inverse Source Problems
6.3 Impedance Tomography
6.4 Optical Tomography
6.4.1 The Radiation Transfer Equation
6.4.2 Diffusion Approximation
6.4.3 Time-harmonic Measurement
6.5 Notes and Comments
7 Case Studies
7.1 Image Deblurring and Recovery of Anomalies
7.1.1 The Model Problem
7.1.2 Reduced and Approximation Error Models
7.1.3 Sampling the Posterior Distribution
7.1.4 Effects of Modelling Errors
7.2 Limited Angle Tomography: Dental X-ray Imaging
7.2.1 The Layer Estimation
7.2.2 MAP Estimates
7.2.3 Sampling: Gibbs Sampler
7.3 Biomagnetic Inverse Problem: Source Localization
7.3.1 Reconstruction with Gaussian White Noise Prior Model
7.3.2 Reconstruction of Dipole Strengths with the e1-prior Model
7.4 Dynamic MEG by Bayes Filtering
7.4.1 A Single Dipole Model
7.4.2 More Realistic Geometry
7.4.3 Multiple Dipole Models
7.5 Electrical Impedance Tomography: Optimal Current Patterns
7.5.1 A Posteriori Synthesized Current Patterns
7.5.2 Optimization Criterion
7.5.3 Numerical Examples
7.6 Electrical Impedance Tomography: Handling Approximation Errors
7.6.1 Meshes and Projectors
7.6.2 The Prior Distribution and the Prior Model
7.6.3 The Enhanced Error Model
7.6.4 The MAP Estimates
7.7 Electrical Impedance Process Tomography
7.7.1 The Evolution Model
7.7.2 The Observation Model and the Computational Scheme
7.7.3 The Fixed-lag State Estimate
7.7.4 Estimation of the Flow Profile
7.8 Optical Tomography in Anisotropic Media
7.8.1 The Anisotropy Model
7.8.2 Linearized Model
7.9 Optical Tomography: Boundary Recovery
7.9.1 The General Elliptic Case
7.9.2 Application to Optical Diffusion Tomography
7.10 Notes and Comments
A Appendix: Linear Algebra and Functional Analysis
A.1 Linear Algebra
A.2 Functional Analysis
A.3 Sobolev Spaces
B Appendix 2: Basics on Probability
B.1 Basic Concepts
B.2 Conditional Probabilities
References
Index
前言/序言
统计和计算逆问题 [Statistical and Computational Inverse Problems] 电子书 下载 mobi epub pdf txt
电子书下载地址:
相关电子书推荐:
- 文件名
- 超级思维-用理工科思维推算世界 【美】亚伦桑托斯 者:白秀敏
- 红珊瑚鉴真与收藏入门
- 电的诞生:1800-1900 9787535280145
- 从现实的维度出发:2017浙江纪实摄影大展作品集
- {RT}天人和谐:生态文明与绿色行动-郭耕 山东教育出版社 9787532891191
- 我的第一堂花艺课:玫瑰主题篇(花时间)
- BF-奔跑的健将-动物原来是这样-陈玉潇 上海科学普及出版社 9787542761323
- 我们摄影吧——时尚摄影达人秘笈
- 揭秘垃圾-尤斯伯恩看里面
- 汉印字典
- 电的诞生:1800-1900 9787535280145
- 石头彩绘技法一本通(全彩)
- 触摸科学-小学科技活动启蒙读物-适用于六年级
- 100个基本+好物100(共2册)
- 电的诞生:1800-1900 9787535280145