Color Image Segmentation by the Vector-Valued Allen–Cahn Phase-Field Model: A Multigrid Solution

Kay, David; Tomasi, Alessandro

doi:10.1109/tip.2009.2026678

Cited by 55 publications

(19 citation statements)

References 30 publications

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“…This idea has been extended for the vector-valued Allen-Cahn equation [34]. Recently,in [30] this technique is applied to problems in image segmentation. A review on various multigrid methods for obstacle problems can be found in [23].…”

Section: Preconditioning For the Allen-cahn Equationmentioning

confidence: 99%

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Preconditioning for Allen–Cahn variational inequalities with non-local constraints

Blank¹,

Sarbu²,

Stoll³

2012

Journal of Computational Physics

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Abstract. The solution of Allen-Cahn variational inequalities with mass constraints is of interest in many applications. This problem can be solved both in its scalar and vector-valued form as a PDE-constrained optimization problem by means of a primal-dual active set method. At the heart of this method lies the solution of linear systems in saddle point form. In this paper we propose the use of Krylov-subspace solvers and suitable preconditioners for the saddle point systems. Numerical results illustrate the competitiveness of this approach.AMS subject classifications. Primary 65F10, 65N22, 65F50 Secondary 76D07 Key words. PDE-constrained optimization, Allen-Cahn model, Newton method, Saddle point systems, Preconditioning, Krylov subspace solver.1. Introduction. The solution of Allen-Cahn variational inequalities with nonlocal constraints can be formulated as an optimal control problem, which can be solved using a primal-dual active set method [4,6,7]. This method has proven very efficient in a variety of applications [27,29,35,36]. As we will show in the course of this paper the solution to a linear system of the form Kx = b with K a real symmetric matrix is at the heart of this method. The sparse linear systems are usually of very large dimension and in combination with 3-dimensional experiments the application of direct solvers such as UMFPack [11] becomes infeasible. As a result iterative methods have to be employed (see e.g. [24,43] for introductions to this field). For symmetric and indefinite systems the Minimal Residual method (minres) [39] is a common solver as it minimizes the 2-norm of the residual r k = b − Kx k over the Krylov subspace span r 0 , Kr 0 , . . . , K k−1 r 0 . The convergence behaviour of the iterative scheme depends on the conditioning of the problem and the clustering of the eigenvalues and can usually be enhanced with preconditioning techniques.P −1 Kx = P −1 b In this paper, we provide an efficient preconditioner P for the solution of Allen-Cahn variational inequalities combining methods for indefinite problems [31,39,48,3] and algebraic multigrid developed for elliptic systems [15,43,42]. The arising linear systems lead to matrices K which have the following saddle point block-structure which arise in a variety of applications [3]

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Section: Preconditioning For the Allen-cahn Equationmentioning

confidence: 99%

“…The scalar Allen-Cahn equation describes the motion of an interface separating two phases. In practical applications often more than two phases occur [7,18,30] and the phase field concept has been extended to deal with multi phase systems [17]. There a vector-valued order parameter u : Ω → R N is introduced, where each u i describes one phase, i.e.…”

mentioning

confidence: 99%

Preconditioning for Allen–Cahn variational inequalities with non-local constraints

Blank¹,

Sarbu²,

Stoll³

2012

Journal of Computational Physics

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show abstract

“…The Allen-Cahn model (or phase field model) has a variety of applications, e.g. in materials science, image processing, biology and geology, see [6,11,14,23,25,30,39]. In many of these applications more than two phases occur.…”

Section: Introductionmentioning

confidence: 99%

Nonlocal Allen-Cahn systems: analysis and a primal-dual active set method

Blank

Garcke

Sarbu

et al. 2013

IMA Journal of Numerical Analysis

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We show existence and uniqueness of a solution for the non-local vector-valued Allen-Cahn variational inequality in a formulation involving Lagrange multipliers for local and non-local constraints. Furthermore, we propose and analyze a primal-dual active set method for local and non-local vector-valued Allen-Cahn variational inequalities. Convergence of the primal-dual active set algorithm is shown by interpreting the approach as a semi-smooth Newton method and numerical simulations are presented demonstrating its efficiency.

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“…Chan, Y. S., see Toni, L., 2476-2490 T Tafti, P. D., Van De Ville, D., and Unser, M., Invariances, Laplacian-Like Wavelet Bases, and the Whitening of Fractal Processes; TIP April 2009 689-702 Tagliasacchi, M., Valenzise, G., and Tubaro, S., Hash-Based Identification of Sparse Image Tampering; 2491-2504 Tai, X.-C., see Han, S., TIP Oct. 20092289-2302 Takeda, H., see Protter, M., TIP Jan. 2009 36-51 Takeda, H., Milanfar, P., Protter, M., and Elad, M., Super-Resolution Without Explicit Subpixel Motion Estimation;1958-1975., see 2153-2166 Tan, T., see Yu, S., TIP Aug. 20091905-1910 Tanaka, Y., Ikehara, M., and Nguyen, T. Q., Multiresolution Image Representation Using Combined 2-D and 1-D Directional Filter Banks; TIP Feb. 2009 269-280 Tang, S., see 1563-1572 Tang, X., see Yan, S., TIP Jan. 2009 202-210 Tang, X., see Wang, H., TIP Jan. 2009 140-150 Tang, X., see Yan, S., TIP March 2009 670-676 Tang, X., see 2153-2166 Tang, Y., see Tian, J., TIP Oct. 20092355-2363 Tang, Y. Y., see Zhang, T., TIP Nov. 2009 Kay, D. A., TIP Oct. 20092330-2339 Toni, L., Chan, Y. S., Cosman, P. C., and Milstein, L. B., Channel Coding for Progressive Images in a 2-D Time-Frequency OFDM Block With Channel Estimation Errors; 2476-2490 Tourneret, J.-Y., see 2059-2070 Tran, T. D., see Sun, G., TIP May 2009 Qu, G., TIP Feb. 2009 435-440 Wang, D., see Han, S., TIP Oct. 20092289-2302 Wang, G., Schultz, L. J., and Qi, J., Bayesian Image Reconstruction for Improving Detection Performance of Muon Tomography; 1080-1089 Wang, H., see Yan, S., TIP Jan. 2009 202-210 Wang, H., …”

mentioning

confidence: 99%

“…-1910 Wu, X., see Zhang, L., TIP April 2009 797-812 Wu, X., Zhang, X., and Wang, X 2303-2315 Zerubia, J., see 1830-1843 Zhai, J., see 1936-1945 Zhang, C., see 1623-1632 Zhang, C., see 1623-1632 Zhang, D., see Zhang, L., TIP April 2009 797-812 Zhang, F., Wu, X., Yang, X., Zhang, W., and Zhang, L 1946-1957 Color Image Segmentation by the Vector-Valued Allen-Cahn Phase-Field Model: A Multigrid Solution. Kay, D. A., +, TIP Oct. 2009 Wang, H., +, TIP Feb. 2009 225-240 Interpolation An Adaptable k-Nearest Neighbors Algorithm for MMSE Image Interpolation. 1976-1987 An MRF-Based DeInterlacing Algorithm With Exemplar-Based Refinement.…”

mentioning

confidence: 99%

2009 Index IEEE Transactions on Image Processing Vol. 18

2009

IEEE Trans. on Image Process.

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Color Image Segmentation by the Vector-Valued Allen–Cahn Phase-Field Model: A Multigrid Solution

Cited by 55 publications

References 30 publications

Preconditioning for Allen–Cahn variational inequalities with non-local constraints

Preconditioning for Allen–Cahn variational inequalities with non-local constraints

Nonlocal Allen-Cahn systems: analysis and a primal-dual active set method

2009 Index IEEE Transactions on Image Processing Vol. 18

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