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Non-Linear Phase Tomography Based on Fréchet Derivative
Non-Linear Phase Tomography Based on Fréchet Derivative
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摘要:
Phase imaging coupled to micro-tomography acquisition has emerged as a powerful tool to investigate specimens in a non-destructive manner. While the intensity data can be acquired and recorded, the phase information of the signal has to be “retrieved” from the data modulus only. Phase retrieval is an ill-posed non-linear problem and regularization techniques including a priori knowledge are necessary to obtain stable solutions. Several linear phase recovery methods have been proposed and it is expected that some limitations resulting from the linearization of the direct problem will be overcome by taking into account the non-linearity of the phase problem. To achieve this goal, we propose and evaluate a non-linear algorithm for in-line phase micro-tomography based on an iterative Landweber method with an analytic calculation of the Fréchet derivative of the phase-intensity relationship and of its adjoint. The algorithm was applied in the projection space using as initialization the linear mixed solution. The efficacy of the regularization scheme was evaluated on simulated objects with a slowly and a strongly varying phase. Experimental data were also acquired at ESRF using a propagation-based X-ray imaging technique for the given pixel size 0.68 μm. Two regularization scheme were considered: first the initialization was obtained without any prior on the ratio of the real and imaginary parts of the complex refractive index and secondly a constant a priori value was assumed on ?. The tomographic central slices of the refractive index decrement were compared and numerical evaluation was performed. The non-linear method globally decreases the reconstruction errors compared to the linear algorithm and is achieving better reconstruction results if no prior is introduced in the initialization solution. For in-line phase micro-tomography, this non-linear approach is a new and interesting method in biomedical studies where the exact value of the a priori ratio is not known.
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| 篇名 | Non-Linear Phase Tomography Based on Fréchet Derivative | ||
| 来源期刊 | 计算机断层扫描(英文) | 学科 | 数学 |
| 关键词 | PHASE Retrieval In-Line PHASE TOMOGRAPHY Inverse Problems NON-LINEAR Problem NON-LINEAR Optimization Fréchet DERIVATIVE Coherent IMAGING FRESNEL Diffraction PHASE Contrast X-Ray IMAGING | ||
| 年,卷(期) | 2014,(4) | 所属期刊栏目 | |
| 研究方向 | 页码范围 | 39-50 | |
| 页数 | 12页 | 分类号 | O1 |
| 字数 | 语种 | ||
| DOI | |||
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PHASE
Retrieval
In-Line
PHASE
TOMOGRAPHY
Inverse
Problems
NON-LINEAR
Problem
NON-LINEAR
Optimization
Fréchet
DERIVATIVE
Coherent
IMAGING
FRESNEL
Diffraction
PHASE
Contrast
X-Ray
IMAGING
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计算机断层扫描(英文)
主办单位:
美国科研出版社
出版周期:
季刊
ISSN:
2169-2475
CN:
开本:
出版地:
武汉市江夏区汤逊湖北路38号光谷总部空间
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58
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0
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