• 한국멀티미디어학회논문지
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• 제2권3호
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• pp.320-328
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• 1999

정칙화 반복복원 과정에 사용되는 정칙화 연산자는 Laplacian 연산자를 주로 사용하고 있으나, 일반적으로 미분 연산자를사용하게 되어있다. 본 논문에서는 정칙화 연산자로서의 일반적인 미분연산자틀과 본 연구실에서 사용 되어 온 I-H 연산자의 성능을 비교, 검토하여 분석하였다. 선형적인 움직임에 의한 훼손된 영상에서는, 평면부분은 I-H 연산자가 Laplacian 연산자보다 복원효과와 MSE의 수렴성이 안정된 것을 알 수 있었으며 윤곽부분은 Laplacian 연산자가 I-H 연산자보다 MSE의 수렴성 및 복원효과가 뛰어남을 알 수 있었다. 가우시안에 의해 훼손된 영상에서는, 융곽부분은 I-H 연산자가 Laplacian 연산자보다 MSE의 수렴성 및 복원효과가뛰어나며 평변부분에서는Laplacian 연산자가 I-H 연산자보다 MSE 변에서 안정적으로 F수렴함을 알 수 있었다. 정칙화 이론은 잡음의 평활화와 윤곽의 복원을 동시에 고려하여 처리하기 때문에 영역을 평면부분과 중간 부분 그리고 윤곽부분으로 나누어서 처리결과에 대한 MSE를 비교하였다. Laplacian 연산자와 I-H 연산자는 정칙화 연산자로 사용하기에 적합하였고 다른 미분 연산자들은 반복횟수에 따라 발산하는 것으로 나타났다.

• 방송공학회논문지
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• 제18권3호
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• pp.463-473
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• 2013

본 논문에서는 다시점 영상을 이용한 초고해상도 영상 복원 기법을 제안한다. 구체적으로 $5{\times}5$ 배열로 구성된 다시점 카메라로 25장의 영상을 취득하고, 가운데 카메라에 해당하는 초고해상도 영상을 저해상도 입력 영상과 24장의 저해상도 참조 영상을 활용하여 생성한다. 우선 입력 영상을 중심으로 스테레오 정합 기법을 이용하여 24개의 참조 영상에 대한 변이지도를 각각 추정한다. 그리고 저해상도 영상과 참조 영상에 있는 일치점들을 이용하여 초고해상도 영상을 복원한다. 최종적으로 반복적 균일화를 통해 초고해상도 영상을 보정한다. 실험을 통하여 본 논문에서 제안한 초고해상도 영상 복원 기법의 성능이 우수함을 확인한다.

• 대한의용생체공학회:의공학회지
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• 제36권5호
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• pp.211-220
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• 2015

Recently, model-based iterative reconstruction (MBIR) has played an important role in transmission tomography by significantly improving the quality of reconstructed images for low-dose scans. MBIR is based on the penalized-likelihood (PL) approach, where the penalty term (also known as the regularizer) stabilizes the unstable likelihood term, thereby suppressing the noise. In this work we further improve MBIR by using a more expressive regularizer which can restore the underlying image more accurately. Here we used a spline regularizer derived from a linear combination of the two-dimensional splines with first- and second-order spatial derivatives and applied it to a non-quadratic convex penalty function. To derive a PL algorithm with the spline regularizer, we used a separable paraboloidal surrogates algorithm for convex optimization. The experimental results demonstrate that our regularization method improves reconstruction accuracy in terms of both regional percentage error and contrast recovery coefficient by restoring smooth edges as well as sharp edges more accurately.

• 대한수학회지
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• 제55권3호
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• pp.719-734
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• 2018

An image restoration problem with Poisson noise arises in many applications of medical imaging, astronomy, and microscopy. To overcome ill-posedness, Total Variation (TV) model is commonly used owing to edge preserving property. Since staircase artifacts are observed in restored smooth regions, higher-order TV regularization is introduced. However, sharpness of edges in the image is also attenuated. To compromise benefits of TV and higher-order TV, the weighted sum of the non-convex TV and non-convex higher order TV is used as a regularizer in the proposed variational model. The proposed model is non-convex and non-smooth, and so it is very challenging to solve the model. We propose an iterative reweighted algorithm with the proximal linearized alternating direction method of multipliers to solve the proposed model and study convergence properties of the algorithm.

• Structural Engineering and Mechanics
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• 제75권4호
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• pp.477-485
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• 2020

Finite element (FE) model based structural damage detection (SDD) methods play vital roles in effectively locating and quantifying structural damages. Among these methods, structural model updating should be conducted before SDD to obtain benchmark models of real structures. However, the characteristics of updating parameters are not reasonably considered in existing studies. Inspired by the l_∞ norm regularization, a novel anti-sparse representation method is proposed for structural model updating in this study. Based on sensitivity analysis, both frequencies and mode shapes are used to define an objective function at first. Then, by adding l_∞ norm penalty, an optimization problem is established for structural model updating. As a result, the optimization problem can be solved by the fast iterative shrinkage thresholding algorithm (FISTA). Moreover, comparative studies with classical regularization strategy, i.e. the l₂ norm regularization method, are conducted as well. To intuitively illustrate the effectiveness of the proposed method, a 2-DOF spring-mass model is taken as an example in numerical simulations. The updating results show that the proposed method has a good robustness to measurement noises. Finally, to further verify the applicability of the proposed method, a six-storey aluminum alloy frame is designed and fabricated in laboratory. The added mass on each storey is taken as updating parameter. The updating results provide a good agreement with the true values, which indicates that the proposed method can effectively update the model parameters with a high accuracy.

• 정보처리학회논문지B
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• 제16B권1호
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• pp.1-6
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• 2009

움직임에 의해 흐려지고 잡음으로 훼손된 영상을 복원하는 것은 매우 어렵다. 기존의 방법들은 영상의 국부적인 특성을 고려하지 않고 영상 전체에 일률적으로 복원처리를 행함으로써 윤곽부분에서 리플잡음을 초래하고 평면부분에서도 잡음증폭을 피할 수 없다. 이러한 문제점을 개선하기 위하여, 본 논문에서는 윤곽방향을 고려한 방향성 정칙화 연산자를 사용하여 적응적으로 처리되는 반복 정칙화 방법을 제안한다. 그것과 더불어 적응 정칙화 파라메타와 이완 파라메타를 적용하는 알고리즘도 함께 제안한다. 결론적으로, 이 방법은 기존의 방법과 비교할 때, 평면부분에서 잡음증폭을 억제하고, 시각적으로 중요한 윤곽부분의 리플잡음을 억제함으로써 윤곽부분 복원에 더욱 효율적임을 실험을 통하여 확인할 수 있었으며 또한 ISNR 면에서도 우수하였다는 것을 확인할 수 있다.

• 한국산학기술학회논문지
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• 제11권10호
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• pp.3928-3934
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• 2010

본 논문에서는 움직임에 의해 흐려지고 잡음으로 훼손된 영상에 대하여 영상전체에 일률적으로 복원처리를 행하는 기존의 적용방법들에서 나타나는 문제점을 해결하고자 영상의 국부적인 특성과 방향성을 고려한 복원방법을 제시한다. 이는 평면영역과 윤곽영역을 적응적으로 처리하기 위하여 윤곽의 방향성을 찾기 위하여 다해상도 신호분석인 Wavelet 계수를 적용하여 처리하는 방법을 제안한다.

• Smart Structures and Systems
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• 제10권4_5호
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• pp.427-442
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• 2012

An effective approach for updating finite element model is presented which can provide reliable estimates for structural updating parameters from identified operational modal data. On the basis of the dynamic perturbation method, an exact relationship between the perturbation of structural parameters such as stiffness change and the modal properties of the tested structure is developed. An iterative solution procedure is then provided to solve for the structural updating parameters that characterise the modifications of structural parameters at element level, giving optimised solutions in the least squares sense without requiring an optimisation method. A regularization algorithm based on the Tikhonov solution incorporating the generalised cross-validation method is employed to reduce the influence of measurement errors in vibration modal data and then to produce stable and reasonable solutions for the structural updating parameters. The Canton Tower benchmark problem established by the Hong Kong Polytechnic University is employed to demonstrate the effectiveness and applicability of the proposed model updating technique. The results from the benchmark problem studies show that the proposed technique can successfully adjust the reduced finite element model of the structure using only limited number of frequencies identified from the recorded ambient vibration measurements.

• 대한기계학회:학술대회논문집
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• 대한기계학회 2007년도 춘계학술대회B
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• pp.3027-3032
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• 2007

To understand the complex phenomena performed in steam explosion, the fast and global measurement of the steam distribution is imperative for this extremely rapid transient stimulation of the bubble breakup and coalescence due to turbulent eddies and shock waves. TROI, the experimental facility requests more robust sensor system to meet this requirement. In Europe, researchers are prefer a X-ray method but this method is very expensive and has limited measurement range. There is an alternative technology such as ECT. Because of TROI's geometry, however, we need axial tomography method. This paper reviews image reconstruction algorethms for axial tomography, including Tikhonov regularization and iterative Tikhonov regularization. Axial tomography method is examined by simulation and experiment for typical permittivity distributions. Future works in axial tomography technology is discussed.

• 대한수학회지
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• 제54권2호
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• pp.613-626
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• 2017

For the overdetermined linear system, when both the data matrix and the observed data are contaminated by noise, Total Least Squares method is an appropriate approach. Since an ill-conditioned data matrix with noise causes a large perturbation in the solution, some kind of regularization technique is required to filter out such noise. In this paper, we consider a Dual regularized Total Least Squares problem. Unlike the Tikhonov regularization which constrains the size of the solution, a Dual regularized Total Least Squares problem considers two constraints; one constrains the size of the error in the data matrix, the other constrains the size of the error in the observed data. Our method derives two nonlinear equations to construct the iterative method. However, since the Jacobian matrix of two nonlinear equations is not guaranteed to be nonsingular, we adopt a trust-region based iteration method to obtain the solution.