• 대한수학회논문집
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• 제22권4호
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• pp.623-640
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• 2007

The Lotka-McKendrick model which describes the evolution of a single population is developed from the well known Malthus model. In this paper, we introduce the Lotka-McKendrick model. We approximate the solution to the model using hp-discontinuous Galerkin finite element method. The numerical results show that the presented hp-discontinuous Galerkin method is very efficient in case that the solution has a sharp decay.

• East Asian mathematical journal
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• 제26권5호
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• pp.615-626
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• 2010

In this paper, we analyze discontinuous Galerkin methods with penalty terms, namly symmetric interior penalty Galerkin methods, to solve nonlinear parabolic equations. We construct finite element spaces on which we develop fully discrete approximations using extrapolated Crank-Nicolson method. We adopt an appropriate elliptic-type projection, which leads to optimal ${\ell}^{\infty}$ ($L^2$) error estimates of discontinuous Galerkin approximations in both spatial direction and temporal direction.

• 대한전기학회논문지
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• 제40권12호
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• pp.1296-1301
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• 1991

This paper presents a hybrid image mode Galerkin method for the analysis of the transmission line structures suspended between infinite parallel ground planes. A Green's function that consists of numerically accelerated image mode terms is developed, which is used in boundary integral equation. Transmission lines of arbitrary cross section are analyzed using Galerkin's method. Two kinds of configurations of transmission lines are studied in sample problems.

• 대한토목학회논문집
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• 제32권3B호
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• pp.175-183
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• 2012

본 연구에서는 천수방정식에 Galerkin법과 Petrov-Galerkin 기법의 일종인 SU/PG 기법을 적용하여 유한요소 천수흐름 해석 모형을 개발하고, 다양한 실험수로에서 이송이 지배적인 흐름을 수치 모의하였다. 수로 내부에 얇은 판 형태의 구조물이 존재하는 경우 Fr 수와 Re 수가 매우 낮은 흐름에서는 Galerkin 기법과 SU/PG 기법이 동일한 결과를 나타냈으나, Fr=1.58인 경우 Galerkin법은 발산하여 해를 얻을 수 없었다. 이 경우 SU/PG법은 Newton-Raphson법에 의한 5회의 반복에 의해 수렴된 유속결과를 구할 수 있었다. 사류와 상류가 혼재하여 천이류가 나타나는 단면확대 수로 모의에서 SU/PG 기법을 이용한 본 연구의 경우 상류단 수심조건이 잘 유지되며, 도수가 발생하는 지점 및 도수에 의한 수심 경사, 도수 후의 수심이 모두 Khalifa(1980)의 실험결과와 매우 근사하였다. 이송이 지배적인 사류(Fr=2.74)에 의한 사각도수 모의의 경우에도 Galerkin 기법은 최초 모의시간의 첫 번째 반복 이후 발산하였으나, SU/PG 기법은 도수 경계면을 수치진동 없이 잘 포착하였으며, 해석해와 비교한 수심 및 유속의 최대 오차는 0.2% 이내로 나타나 기존 연구(Levin 등, 2006; Ricchiuto 등, 2007)에 비해 더욱 정확한 결과를 도출하였다.

• 충청수학회지
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• 제10권1호
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• pp.57-70
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• 1997

In this paper two preconditioned GMRES and QMR methods are applied to the non-Hermitian system from the Petrov-Galerkin procedure for the Poisson equation and compared to each other. To our purpose the ILUT and the SSOR preconditioners are used.

• Journal of the Korean Society for Industrial and Applied Mathematics
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• 제2권1호
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• pp.61-71
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• 1998

Petrov-Galerkin method is investigated for solving nonlinear systems without monotonicity. A monotone iteration is provided for solving the resulting problem. The numerical results show the advantages of such method.

• Journal of Mechanical Science and Technology
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• 제20권1호
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• pp.94-109
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• 2006

An improved meshfree method called the Petrov-Galerkin natural element (PG-NE) method is introduced in order to secure the numerical integration accuracy. As in the Bubnov-Galerkin natural element (BG-NE) method, we use Laplace interpolation function for the trial basis function and Delaunay triangles to define a regular integration background mesh. But, unlike the BG-NE method, the test basis function is differently chosen, based on the Petrov-Galerkin concept, such that its support coincides exactly with a regular integration region in background mesh. Illustrative numerical experiments verify that the present method successfully prevents the numerical accuracy deterioration stemming from the numerical integration error.

• 한국공간구조학회논문집
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• 제7권4호
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• pp.55-61
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• 2007

근래에 이르러 컴퓨터의 발전과 더불어 유한요소법이 가장 많이 사용되고 있는 수치해석수법이 되어 왔다. 그러나 유한요소법은 각각의 구조물을 해석하는 데는 탁월한 능력을 발휘하지만 구조물을 형성하는 파라메타에 대한 영향 또는 경향을 파악하는 것에 대해서는 갤러킨법이 더욱 유효하다. 본 논문은 구조물을 형성하는 파라메타에 대한 영향 경향을 파악하는 것에 유리한 갤러킨법(Galerkin's Method)을 이용하여 고유치 해석을 수행하고 아치를 형성하는 파라메타가 고유진동응답에 미치는 영향을 고찰한다.

• 한국전산유체공학회:학술대회논문집
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• 한국전산유체공학회 2010년 춘계학술대회논문집
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• pp.534-541
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• 2010

A high-order accurate Euler flow solver based on a discontinuous Galerkin method has been developed for the numerical simulation of unsteady flows on unstructured meshes. A multi-level solution-adaptive mesh refinement/coarsening technique was adopted to enhance the resolution of numerical solutions efficiently by increasing mesh density in the high-gradient region. An acoustic wave scattering problem was investigated to assess the accuracy of the present discontinuous Galerkin solver, and a supersonic flow in a wind tunnel with a forward facing step was simulated by using the adaptive mesh refinement technique. It was shown that the present discontinuous Galerkin flow solver can capture unsteady flows including the propagation and scattering of the acoustic waves as well as the strong shock waves.

• Journal of the Korean Society for Industrial and Applied Mathematics
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• 제18권4호
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• pp.337-350
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• 2014

In this paper, we consider discontinuous Galerkin finite element methods with interior penalty term to approximate the solution of nonlinear parabolic problems with mixed boundary conditions. We construct the finite element spaces of the piecewise polynomials on which we define fully discrete discontinuous Galerkin approximations using the Crank-Nicolson method. To analyze the error estimates, we construct an appropriate projection which allows us to obtain the optimal order of a priori ${\ell}^{\infty}(L^2)$ error estimates of discontinuous Galerkin approximations in both spatial and temporal directions.