• 충청수학회지
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• 제34권3호
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• pp.189-207
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• 2021

In this paper, we consider the approximate controllability for a class of semilinear integro-differential functional control equations in which nonlinear terms of given equations satisfy quasi-homogeneous properties. The main method used is to make use of the surjective theorems that is similar to Fredholm alternative in the nonlinear case under restrictive assumptions. The sufficient conditions for the approximate controllability is obtain which is different from previous results on the system operator, controller and nonlinear terms. Finally, a simple example to which our main result can be applied is given.

• Korean Journal of Mathematics
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• 제30권4호
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• pp.603-614
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• 2022

The main intent of this paper is to prove an existence and uniqueness fixed point result under Geraghty contractions in b-metric-like spaces, which remains an extended version of corresponding results in b-metric spaces and metriclike spaces. Using two types of Geraghty contractions, an approach is adopted to verify some fixed point results in b-metric-like spaces. Our main result is an extension of an earlier result given by Geraghty in b-metric-like-space. An example is also provided to demonstrate the validity of our main result. Moreover, as an application of our main result, the existence of solution of a Fredholm integral equation is established which may further be utilized to study the seismic response of dams during earthquakes.

• 응용통계연구
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• 제18권1호
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• pp.57-66
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• 2005

본 연구에서는 얼랑(Erlang)분포의 규모모수에 대 한 축차확률비검정(SPRT)과 관련된 적분방정식의 정학한 해를 구하는 법을 살펴보기로 한다. 축차확률비검정에서 그 평균 표본 개수, 그리고 1종 오류 확률과 2종 오류 확률은 프레돔 형태의 적분 방정식으로 나타나게 된다. 이러한 적분 방정식은 보통 가우시안 쿼드러쳐(qudrature)를 이용하여 근사적으로 그 해를 구하는 것이 일반적이다. 얼랑분포의 경우 이러한 적분방정식의 해가 정확하게 구할 수 있음이 알려져 있다. 본 연구에서는 얼랑분포에서 그 해를 구하는 구체적 방법을 살펴보기로 한다.

• 대한조선학회지
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• 제19권1호
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• pp.23-32
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• 1982

Herein the motion of a freely-floating sphere in a water of finite depth is analysed within the framework of a linear potential theory. A velocity potential describing fluid motion is generated by distributing pulsating sources and dipoles on the immersed surface of the sphere, without introducing an inner flow model. The potential becomes the solution of an integral equation of Fredholm's second type. In the light of the vertical axisymmetry of the flow, surface integrals reduce to line integrals, which are approximated by summation of the products of the integrand and the length of segments along the contour. Following this computational scheme the diffraction potential and the radiation potential are determined from the same algorithm of solving a set of simultaneous linear equations. Upon knowing values of the potentials hydrodynamic forces such as added mass, hydrodynamic damping and wave exciting forces are evaluated by the integrating pressure over the immersed surface of the sphere. It is found in the case of finite water depth that the hydrodynamic forces are much different from the corresponding ones in deep water. Accordingly motion response of the sphere in a water of finite depth displays a particular behavior both in a amplitude and phase.

• Structural Engineering and Mechanics
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• 제85권5호
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• pp.621-633
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• 2023

The major objective of this paper is to study the receding contact problem between two functional graded layers under a flat indenter. The gravity is assumed negligible, and the shear moduli of both layers are assumed to vary exponentially along the thickness direction. In the absence of body forces, the problem is reduced to a system of Fredholm singular integral equations with the contact pressure and contact size as unknowns via Fourier integral transform, which is transformed into an algebraic one by the Gauss-Chebyshev quadratures and polynomials of both the first and second kinds. Then, an iterative speediest descending algorithm is proposed to numerically solve the system of algebraic equations. Both semi-analytical and finite element method, FEM solutions for the presented problem validate each other. To improve the accuracy of the numerical result of FEM, a graded FEM solution is performed to simulate the FGM mechanical characteristics. The results reveal the potential links between the contact stress/size and the indenter size, the thickness, as well as some other material properties of FGM.

• 한국음향학회지
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• 제39권3호
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• pp.151-162
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• 2020

본 논문에서는 음향 역산법을 이용한 기포의 크기 분포 추정 기법을 제시하였다. 제 1종 Fredholm 적분방정식으로 표현된 감쇠계수의 추정오차를 목적함수로 정의하였고, 최적해를 구하기 위해 Levenberg-Marquardt(LM)기법을 적용하였다. 두 가지의 기포 분포에 대한 수치 시뮬레이션을 통해 제안된 역산 기법의 유용성을 검증하였다. 세 종류의 기포발생기를 이용하여 사각 수조(1.0 m × 0.54 m × 0.6 m)에서 기포 실험을 수행하였다. 고속카메라 촬영을 통해 기포의 분포 이미지를 획득하였고, 음원과 수중청음기를 이용하여 기포층의 주파수별 삽입손실(insertion loss)을 계측하였다. 촬영된 이미지는 후처리를 통해 기포 발생기별 기포 분포 특성을 파악하는데 활용하였고, 계측된 삽입손실에 역산 기법을 적용하여 기포의 크기 분포를 추정하였다. 음향 역산결과로부터 기포의 크기가 작아짐에 따라 기포 개수는 지수적으로 증가하며, 70 ㎛ ~ 120 ㎛의 국부 피크를 지난 후 다시 증가하는 경향성을 확인하였다.

• 대한조선학회지
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• 제23권4호
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• pp.25-34
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• 1986

A two-dimensional linear method has been developed for the motion and the second-order steady force arising from the hydrodynamic coupling between waves and currents in the presence of a body of arbitrary shape. Interaction between the incident wave and current in the absence of the body lies in the realm beyond our interest. A Fredholm integral equation of the second kind is employed in association with the Haskind's potential for a steadily moving source of pulsating strength located in or below the free surface. The numerical calculations at the preliminary stage showed a significant fluctuation of the hydrodynamic forces on the surface-piercing body. The problem is approximately solved by using the asymptotic Green function for $U^2{\rightarrow}0$. The original Green function, however, is applied for the fully submerged body. Numerical calculations are made for a submerged and for a half-immersed circular cylinder and extensively for the mid-ship section of a Lewis-form. Some of the results are compared with other analytical results without any available experimental data. The current has strong influence on roll motion near resonance. When the current opposes the waves, the roll response are generally negligible in the low frequency region. The current has strong influence on roll motion near resonance. When the current opposes the wave, the roll response decreases. When the current and wave come from the same direction, the roll response increases significantly, as the current speed increases. The mean drift forces and moment on the submerged body are more affected by current than those on the semi-immersed circular cylinder or on the ship-like section in the encounter frequency domain.

• Geomechanics and Engineering
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• 제31권5호
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• pp.477-488
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• 2022

Pile composite foundation (PCF) has been commonly applied in practice. Existing research has focused primarily on semi-infinite media having equal pile lengths with little attention given to the effects of inclined bedrock and dissimilar pile lengths. This investigation considers the effects of inclined bedrock on vertical loaded PCF with dissimilar pile lengths. The pile-soil system is decomposed into fictitious piles and extended soil. The Fredholm integral equation about the axial force along fictitious piles is then established based on the compatibility of axial strain between fictitious piles and extended soil. Then, an iterative procedure is induced to calculate the PCF characteristics with a rigid cap. The results agree well with two field load tests of a single pile and numerical simulation case. The settlement and load transfer behaviors of dissimilar 3-pile PCFs and the effects of inclined bedrock are analyzed, which shows that the embedded depth of the inclined bedrock significantly affects the pile-soil load sharing ratios, non-dimensional vertical stiffness N₀/wdE_s, and differential settlement for different length-diameter ratios of the pile l/d and pile-soil stiffness ratio k conditions. The differential settlement and pile-soil load sharing ratios are also influenced by the inclined angle of the bedrock for different k and l/d. The developed model helps better understand the PCF characteristics over inclined bedrock under vertical loading.

• 대한조선학회논문집
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• 제28권1호
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• pp.12-18
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• 1991

3차원(次元) 탱크내에서의 유체(流體)의 슬로싱 현상(現象)에 관하여 경계적분법(境界積分法)의 패널 방법(方法)을 이용한 경계치(境界値) 문제해법(問題解法)으로 수치계산(數値計算)하였다. Shinkai는 경계요소(境界要素)의 소오스의 세기가 절점(節点) 사이에서 선형변화(線型變化)하도록 계산하였음에 반하여 본 연구에서는 삼각형(三角形)패널마다 일정(一定)한 세기의 소오스를 분포(分布)시켰다. 각(各) 시간(時間)단계에서의 소오스의 세기는 Green 정리(定理)에 의한 제2종(第2種) Fredbolm적분(積分) 방정식(方程式)을 풀어서 구하며, 시간(時間)이 경과함에 따른 수치 계산과 이에 따른 오차(誤差)의 누적을 피하기 위하여 Adam-Bashforth-Moulton 방법(方法)을 이용하였다. 강제조화(强制調和)동요하는 선박의 구형(球形)탱크가 부분적재(部分積載)된 경우에 대하여 수치(數値)계산한 결과, 자유표면(自由表面)의 높이 계산치(計算値)는 Shinkai의 결과와 비교한 바 비교적 적은 시간동안에는 잘 일치하고 있음을 확인하였다. 본 수치 계산방법(方法)의 정도(精度)를 검토하기 위하여 입력(入力) 및 출력(出力) 에너지가 보존(保存)되는지를 확인하여 보았는데, 시간이 경과되면서 약간의 오차가 있지만 문제의 비선형성(非線型性), 모델의 패널수가 작음을 감안할때는 인정할 만한 정확도(正確度)로 판단된다.