• Communications for Statistical Applications and Methods
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• 제21권3호
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• pp.253-260
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• 2014

The intraclass correlation model has a long history of applications in several fields of research. Case deletion diagnostic methods for the intraclass correlation model are proposed. Based on the likelihood equations, we derive a formula for a case deletion diagnostic method which enables us to investigate the influence of observations on the maximum likelihood estimates of the model parameters. Using the Taylor series expansion we develop an approximation to the likelihood distance. Numerical examples are provided for illustration.

• 대한전기학회논문지:시스템및제어부문D
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• 제53권8호
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• pp.602-605
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• 2004

A novel motion vector re-estimation technique for transcoding into lower spatial resolution is proposed. This technique is based on the fact that the block matching error is proportional to the complexity of the reference block with Taylor series expansion. It is shown that the motion vectors re-estimated by the proposed method are closer to optimal ones and offer better quality than those of previous techniques.

• 한국정밀공학회지
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• 제12권6호
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• pp.145-151
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• 1995

The first-order Taylor series expansion can be evaluated analytically from the formulated symbolic nonlinear dynamic equations. A closed-form linear dynamic euation is derived about a nominal trajectory. The state space representation of the linearized dynamics can be derived easily from the closed-form linear dynamic equations. But manual symbolic expansion of dynamic equations and linearization is tedious, time-consuming and error-prone. So it is desirable to manipulate the procedures using a computer. In this paper, the analytic linearization is performed using the symbolic language MATHEMATICA. Two examples are given to illustrate the approach anbd to compare nonlinear model with linear model.

• 정보보호학회논문지
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• 제18권4호
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• pp.93-102
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• 2008

이기종 지문센서 상호호환은 다른 센서 사용에 따른 각각의 지문 데이터의 변이성을 보상하기 위한 시스템의 능력을 말한다. 본 연구는 다양한 이기종 지문입력 센서의 호환을 위한 지문 특징점 보정 알고리즘 개발을 목적으로 한다. 제안한 보정 알고리즘은 테일러시리즈(Taylor Series) 전개식을 이용하여 서로 다른 센서로부터 획득된 이미지 간의 대응되는 특징점 사이의 변환식을 구하고, 이를 적용하여 이기종 센서간의 오차를 줄이는 방법이다. 도출한 테일러시리즈 변환 파라미터로 지문 특징점 템플릿을 변환하여 보정 전과 후의 결과를 실험하였다. 제안한 보정 알고리즘을 이용한 결과 보정 전보다 보정 후의 EER 에러가 전체적으로 60%이상 개선됨을 확인할 수 있다.

• Kyungpook Mathematical Journal
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• 제62권3호
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• pp.583-593
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• 2022

Lienard's equations are important nonlinear differential equations with application in many areas of applied mathematics. In the present article, a new approach known as the modified fractional Taylor series method (MFTSM) is proposed to solve the nonlinear fractional Lienard equations with Caputo fractional derivatives, and the convergence of this method is established. Numerical examples are given to verify our theoretical results and to illustrate the accuracy and effectiveness of the method. The results obtained show the reliability and efficiency of the MFTSM, suggesting that it can be used to solve other types of nonlinear fractional differential equations that arise in modeling different physical problems.

• 소음진동
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• 제3권4호
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• pp.353-359
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• 1993

In this study, the Taylor-Galerkin method is modified to take into consideration the third order term in the Taylor series of the fundamental variable. In the Taylor-Galerkin method, after expressing the governing equation of motion in conservation form, the temporal discretization is done first and then spatial discretization follows in contrast to the conventional approaches. A predictor-corrector type algorithm has been developed previously by the same author. A new computationally efficient direct algorithm is proposed in this study. A study on convergency and accuracy of the solution is carried out. Numerical examples show that this new algorithm exhibits the same order of accuracy with less computational effort.

• 한국정밀공학회:학술대회논문집
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• 한국정밀공학회 2005년도 춘계학술대회 논문집
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• pp.840-843
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• 2005

For an analysis of nonlinear dynamic behavior in carbon nanotube(CNT) an electrostatic force of CNT was investigated. The boundary condition in the CNT was assumed to clamped-clamped case at both ends. This type of CNT is widely used as micro and nano-sensors. For larger gaps in between sensor and electrode the van der Waals force can be ignored. The electrostatic force can be expressed as linear form using Taylor series. However, the first term of the series expansion was investigated here. The electrostatic force From this study we can conclude that for larger gaps the electrostatic force play an important role in determining the deflections as well as the pull-in voltage of simply supported switches.

• Structural Engineering and Mechanics
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• 제20권6호
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• pp.713-726
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• 2005

Based on the improved first order Taylor interval expansion, a new interval analysis method for the static or dynamic response of the structures with interval parameters is presented. In the improved first order Taylor interval expansion, the first order derivative terms of the function are also considered to be intervals. Combining the improved first order Taylor series expansion and the interval extension of function, the new interval analysis method is derived. The present method is implemented for a continuous beam and a frame structure. The numerical results show that the method is more accurate than the one based on the conventional first order Taylor expansion.

• Journal of applied mathematics & informatics
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• 제35권1_2호
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• pp.165-180
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• 2017

In this study, Taylor matrix algorithm is designed for the approximate solution of linear and non-linear differential equation systems. The algorithm is essentially based on the expansion of the functions in differential equation systems to Taylor series and substituting the matrix forms of these expansions into the given equation systems. Using the Mathematica program, the matrix equations are solved and the unknown Taylor coefficients are found approximately. The presented numerical approach is discussed on samples from various linear and non-linear differential equation systems as well as stiff systems. The computational data are then compared with those of some earlier numerical or exact results. As a result, this comparison demonstrates that the proposed method is accurate and reliable.

• 한국전산구조공학회논문집
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• 제25권2호
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• pp.139-148
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• 2012

MLS(Moving Least Squares) 차분법은 무요소법의 이동최소제곱법과 Taylor 전개를 이용하여 요소망의 제약 및 수치 적분이 없이 절점만을 이용하여 미분방정식을 수치해석할 수 있는 방법이다. 본 연구에서는 고체역학 문제의 동적해석을 위하여 MLS 차분법의 시간이력해석 알고리즘을 제시한다. 개발된 알고리즘은 Newmark 방법으로 시간적분을 하였으며, 강형식을 그대로 이산화하여 해석을 수행했다. 이동최소제곱법을 이용해 Taylor 전개식을 근사하여 실제 미분계산없이 미분근사식을 얻기 때문에 고차까지 Taylor 다항식의 차수를 증가하는 것이 용이하다. 1차원과 2차원 수치예제들을 통하여 동적해석을 위한 MLS 차분법의 정확성과 효율성을 검증하였다. 수치결과들이 정확해에 잘 수렴하였으며, 유한요소법(FEM)의 해석결과와 비교하여 떨림현상(oscillation) 및 주기성(periodicity) 오차에 대해 보다 안정적인 모습을 보였다.