Все выпуски
- 2024 Том 16
- 2023 Том 15
- 2022 Том 14
- 2021 Том 13
- 2020 Том 12
- 2019 Том 11
- 2018 Том 10
- 2017 Том 9
- 2016 Том 8
- 2015 Том 7
- 2014 Том 6
- 2013 Том 5
- 2012 Том 4
- 2011 Том 3
- 2010 Том 2
- 2009 Том 1
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Удаление шума из изображений с использованием предлагаемого алгоритма трехчленного сопряженного градиента
Компьютерные исследования и моделирование, 2024, т. 16, № 4, с. 841-853Алгоритмы сопряженных градиентов представляют собой важный класс алгоритмов безусловной оптимизации с хорошей локальной и глобальной сходимостью и скромными требованиями к памяти. Они занимают промежуточное место между методом наискорейшего спуска и методом Ньютона, поскольку требуют вычисленияи хранения только первых производных и как правило быстрее методов наискорейшего спуска. В данном исследовании рассмотрен новый подход в задаче восстановления изображений. Он наследует одновременно методу сопряженных градиентов Флетчера – Ривза (FR) и трехкомпонентному методу сопряженных градиентов (TTCG), и поэтому назван авторами гибридным трехкомпонентным методом сопряженных градиентов (HYCGM). Новое направление спуска в нем учитывает текущее направления градиента, предыдущее направления спуска и градиент из предыдущей итерации. Показано, что новый алгоритм обладает свойствами глобальной сходимости и монотонности при использовании неточного линейного поиска типа Вулфа при некоторых стандартных предположениях. Для подтверждения эффективности предложенного алгоритма приводятся результаты численных экспериментов предложенного метода в сравнении с классическим методом Флетчера – Ривза (FR) и трехкомпонентным методом Флетчера – Ривза (TTFR).
Noise removal from images using the proposed three-term conjugate gradient algorithm
Computer Research and Modeling, 2024, v. 16, no. 4, pp. 841-853Conjugate gradient algorithms represent an important class of unconstrained optimization algorithms with strong local and global convergence properties and simple memory requirements. These algorithms have advantages that place them between the steep regression method and Newton’s algorithm because they require calculating the first derivatives only and do not require calculating and storing the second derivatives that Newton’s algorithm needs. They are also faster than the steep descent algorithm, meaning that they have overcome the slow convergence of this algorithm, and it does not need to calculate the Hessian matrix or any of its approximations, so it is widely used in optimization applications. This study proposes a novel method for image restoration by fusing the convex combination method with the hybrid (CG) method to create a hybrid three-term (CG) algorithm. Combining the features of both the Fletcher and Revees (FR) conjugate parameter and the hybrid Fletcher and Revees (FR), we get the search direction conjugate parameter. The search direction is the result of concatenating the gradient direction, the previous search direction, and the gradient from the previous iteration. We have shown that the new algorithm possesses the properties of global convergence and descent when using an inexact search line, relying on the standard Wolfe conditions, and using some assumptions. To guarantee the effectiveness of the suggested algorithm and processing image restoration problems. The numerical results of the new algorithm show high efficiency and accuracy in image restoration and speed of convergence when used in image restoration problems compared to Fletcher and Revees (FR) and three-term Fletcher and Revees (TTFR).
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Image noise removal method based on nonconvex total generalized variation and primal-dual algorithm
Компьютерные исследования и моделирование, 2023, т. 15, № 3, с. 527-541In various applications, i. e., astronomical imaging, electron microscopy, and tomography, images are often damaged by Poisson noise. At the same time, the thermal motion leads to Gaussian noise. Therefore, in such applications, the image is usually corrupted by mixed Poisson – Gaussian noise.
In this paper, we propose a novel method for recovering images corrupted by mixed Poisson – Gaussian noise. In the proposed method, we develop a total variation-based model connected with the nonconvex function and the total generalized variation regularization, which overcomes the staircase artifacts and maintains neat edges.
Numerically, we employ the primal-dual method combined with the classical iteratively reweighted $l_1$ algorithm to solve our minimization problem. Experimental results are provided to demonstrate the superiority of our proposed model and algorithm for mixed Poisson – Gaussian removal to state-of-the-art numerical methods.
Image noise removal method based on nonconvex total generalized variation and primal-dual algorithm
Computer Research and Modeling, 2023, v. 15, no. 3, pp. 527-541In various applications, i. e., astronomical imaging, electron microscopy, and tomography, images are often damaged by Poisson noise. At the same time, the thermal motion leads to Gaussian noise. Therefore, in such applications, the image is usually corrupted by mixed Poisson – Gaussian noise.
In this paper, we propose a novel method for recovering images corrupted by mixed Poisson – Gaussian noise. In the proposed method, we develop a total variation-based model connected with the nonconvex function and the total generalized variation regularization, which overcomes the staircase artifacts and maintains neat edges.
Numerically, we employ the primal-dual method combined with the classical iteratively reweighted $l_1$ algorithm to solve our minimization problem. Experimental results are provided to demonstrate the superiority of our proposed model and algorithm for mixed Poisson – Gaussian removal to state-of-the-art numerical methods.
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A hybrid regularizers approach based model for restoring image corrupted by Poisson noise
Компьютерные исследования и моделирование, 2021, т. 13, № 5, с. 965-978Image denoising is one of the fundamental problems in digital image processing. This problem usually refers to the reconstruction of an image from an observed image degraded by noise. There are many factors that cause this degradation such as transceiver equipment, or environmental influences, etc. In order to obtain higher quality images, many methods have been proposed for image denoising problem. Most image denoising method are based on total variation (TV) regularization to develop efficient algorithms for solving the related optimization problem. TV-based models have become a standard technique in image restoration with the ability to preserve image sharpness.
In this paper, we focus on Poisson noise usually appearing in photon-counting devices. We propose an effective regularization model based on combination of first-order and fractional-order total variation for image reconstruction corrupted by Poisson noise. The proposed model allows us to eliminate noise while edge preserving. An efficient alternating minimization algorithm is employed to solve the optimization problem. Finally, provided numerical results show that our proposed model can preserve more details and get higher image visual quality than recent state-of-the-art methods.
A hybrid regularizers approach based model for restoring image corrupted by Poisson noise
Computer Research and Modeling, 2021, v. 13, no. 5, pp. 965-978Image denoising is one of the fundamental problems in digital image processing. This problem usually refers to the reconstruction of an image from an observed image degraded by noise. There are many factors that cause this degradation such as transceiver equipment, or environmental influences, etc. In order to obtain higher quality images, many methods have been proposed for image denoising problem. Most image denoising method are based on total variation (TV) regularization to develop efficient algorithms for solving the related optimization problem. TV-based models have become a standard technique in image restoration with the ability to preserve image sharpness.
In this paper, we focus on Poisson noise usually appearing in photon-counting devices. We propose an effective regularization model based on combination of first-order and fractional-order total variation for image reconstruction corrupted by Poisson noise. The proposed model allows us to eliminate noise while edge preserving. An efficient alternating minimization algorithm is employed to solve the optimization problem. Finally, provided numerical results show that our proposed model can preserve more details and get higher image visual quality than recent state-of-the-art methods.
Журнал индексируется в Scopus
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Журнал входит в систему Российского индекса научного цитирования.
Журнал включен в базу данных Russian Science Citation Index (RSCI) на платформе Web of Science
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