Elastica Models for Color Image Regularization

Líu, Hao; Tai, Xue–Cheng; Kimmel, Ron; Glowinski, Roland

doi:10.48550/arxiv.2203.09995

Cited by 3 publications

(3 citation statements)

References 51 publications

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“…On the other hand, Euler's elastica term has long been used in image processing, especially in image segmentation [24,25] and denoising [26]. Using Euler's elastica as a regularization term to address issues such as the staircase effect and contrast loss in loworder models is currently a popular topic [27,28]; however, due to the challenges associated with its application in point cloud reconstruction, there is currently a lack of research in this specific area.…”

Section: Introductionmentioning

confidence: 99%

Three-Dimensional Surface Reconstruction from Point Clouds Using Euler’s Elastica Regularization

Song,

Pan,

Zhang

et al. 2023

Applied Sciences

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Euler’s elastica energy regularizer, initially employed in mathematical and physical systems, has recently garnered much attention in image processing and computer vision tasks. Due to the non-convexity, non-smoothness, and high order of its derivative, however, the term has yet to be effectively applied in 3D reconstruction. To this day, the industry is still searching for 3D reconstruction systems that are robust, accurate, efficient, and easy to use. While implicit surface reconstruction methods generally demonstrate superior robustness and flexibility, the traditional methods rely on initialization and can easily become trapped in local minima. Some low-order variational models are able to overcome these issues, but they still struggle with the reconstruction of object details. Euler’s elastica term, on the other hand, has been found to share the advantages of both the TV regularization term and the curvature regularization term. In this paper, we aim to address the problems of missing details and complex computation in implicit 3D reconstruction by efficiently using Euler’s elastica term. The main contributions of this article can be outlined in three aspects. Firstly, Euler’s elastica is introduced as a regularization term in 3D point cloud reconstruction. Secondly, a new dual algorithm is devised for the proposed model, significantly improving solution efficiency compared to the commonly used TV model. Lastly, numerical experiments conducted in 2D and 3D demonstrate the remarkable performance of Euler’s elastica in enhancing features of curved surfaces during point cloud reconstruction. The reconstructed point cloud surface adheres more closely to the initial point cloud surface when compared to the classical TV model. However, it is worth noting that Euler’s elastica exhibits a lesser capability in handling local extrema compared to the TV model.

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Section: Introductionmentioning

confidence: 99%

Three-Dimensional Surface Reconstruction from Point Clouds Using Euler’s Elastica Regularization

Song,

Pan,

Zhang

et al. 2023

Applied Sciences

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“…All variables will be updated in an alternative fashion, where each subproblem either has an explicit solution or can be solved efficiently. The operator-splitting method has been applied to numerically solving PDEs [28,37], image processing [39,15,38,40], surface reconstruction [32], inverse problems [27], obstacle problems [41], and computational fluid dynamics [8,7]. We refer readers to monographs [29,30] for detailed discussions on operatorsplitting methods.…”

Section: Introductionmentioning

confidence: 99%

An Efficient Operator-Splitting Method for the Eigenvalue Problem of the Monge-Ampère Equation

Líu¹,

Leung²,

Qian³

2022

Preprint

Self Cite

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We develop an efficient operator-splitting method for the eigenvalue problem of the Monge-Ampère operator in the Aleksandrov sense. The backbone of our method relies on a convergent Rayleigh inverse iterative formulation proposed by Abedin and Kitagawa (Inverse iteration for the Monge-Ampère eigenvalue problem, Proceedings of the American Mathematical Society, 148 (2020), no. 11, 4975-4886). Modifying the theoretical formulation, we develop an efficient algorithm for computing the eigenvalue and eigenfunction of the Monge-Ampère operator by solving a constrained Monge-Ampère equation during each iteration. Our method consists of four essential steps: (i) Formulate the Monge-Ampère eigenvalue problem as an optimization problem with a constraint; (ii) Adopt an indicator function to treat the constraint; (iii) Introduce an auxiliary variable to decouple the original constrained optimization problem into simpler optimization subproblems and associate the resulting new optimization problem with an initial value problem; and (iv) Discretize the resulting initial-value problem by an operator-splitting method in time and a mixed finite element method in space. The performance of our method is demonstrated by several experiments. Compared to existing methods, the new method is more efficient in terms of computational cost and has a comparable rate of convergence in terms of accuracy.

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“…All variables will be updated in an alternative fashion, where each subproblem either has an explicit solution or can be solved efficiently. The operator-splitting method has been applied to numerically solving PDEs [30,39], image processing [16,40,41,42], surface reconstruction [34], inverse problems [29], obstacle problems [43], and computational fluid dynamics [7,8]. We refer readers to monographs [31,32] for detailed discussions on operator-splitting methods.…”

Section: Introductionmentioning

confidence: 99%

An efficient operator-splitting method for the eigenvalue problem of the Monge-Ampère equation

Líu¹,

Leung²,

Qian³

2022

Commu. Optim. Theory

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We develop an efficient operator-splitting method for the eigenvalue problem of the Monge-Ampère operator in the Aleksandrov sense. The backbone of our method relies on a convergent Rayleigh inverse iterative formulation proposed by Abedin and Kitagawa (Inverse iteration for the Monge-Ampère eigenvalue problem, Proceedings of the American Mathematical Society, 148 (2020) 4975-4886). Modifying the theoretical formulation, we develop an efficient algorithm for computing the eigenvalue and eigenfunction of the Monge-Ampère operator by solving a constrained Monge-Ampère equation during each iteration. Our method consists of four essential steps: (i) Formulate the Monge-Ampère eigenvalue problem as an optimization problem with a constraint; (ii) Adopt an indicator function to treat the constraint; (iii) Introduce an auxiliary variable to decouple the original constrained optimization problem into simpler optimization subproblems and associate the resulting new optimization problem with an initial value problem; and (iv) Discretize the resulting initial-value problem by an operator-splitting method in time and a mixed finite element method in space. The performance of our method is demonstrated by several experiments. Compared to existing methods, the new method is more efficient in terms of computational cost and has a comparable rate of convergence in terms of accuracy.

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Elastica Models for Color Image Regularization

Cited by 3 publications

References 51 publications

Three-Dimensional Surface Reconstruction from Point Clouds Using Euler’s Elastica Regularization

Three-Dimensional Surface Reconstruction from Point Clouds Using Euler’s Elastica Regularization

An Efficient Operator-Splitting Method for the Eigenvalue Problem of the Monge-Ampère Equation

An efficient operator-splitting method for the eigenvalue problem of the Monge-Ampère equation

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