Indexed by:会议论文
Date of Publication:2013-12-14
Included Journals:EI、CPCI-S、Scopus
Page Number:655-658
Key Words:image registration; total variation; homotopy method; regularization
Abstract:The so-called image registration is to find an optimal spatial transformation such that the transformed template image becomes similar to the reference image as much as possible. Several partial differential equations (PDEs) based variational methods can be used for deformable image registration, mainly differing in how regularization for deformation fields[1]. Regularization techniques based on total variation (TV) preserving discontinuities of the deformation field are useful to a class of problems where smoothness is less a concern. A previous study by C. Frohn-Schauf, S. Henn [2,3] considered multigrid method and the sequential quadratic approximation on total variation based image registration. On one hand,although the approximation solutions obtained from C. Frohn-Schauf, S. Henn [2,3] are visually pleasing, they may not fulfill the necessary condition for being a minimiser of the variational problem (4), we can refer to [12, P-660]. On the other hand, when the smoothing parameter beta is very small, the corresponding Euler-Lagrange equation (EL) is very difficult to solve. In this paper, we propose a homotopy method to solve the resulting TV based EL equation and consider using curve tracking to select smoothing parameter beta adaptively. Numerical experiments confirms that our proposed method can effectively find a highly accurate solution and produce excellent image registration results in terms of image quality.
Professor
Supervisor of Doctorate Candidates
Supervisor of Master's Candidates
Gender:Male
Alma Mater:吉林大学
Degree:Doctoral Degree
School/Department:数学科学学院
Discipline:Computational Mathematics. Financial Mathematics and Actuarial Science
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