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유한요소해석과 유한차분법을 이용한 최적최하향법의 구배 방향을 따르는 1차원 함수 도출 = Deriving One-Demensional Function along Gradient Direction for Optimal Steepest Descent Method using Finite Element Analysis and Finite Difference Method

고만수 2021년

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영향력

논문상세정보

- 저자 고만수
- 형태사항 26 cm
- 학위논문사항 호서대학교 대학원, 학위논문(박사)-, 2021. 8, 기계공학과
- 발행지 천안
- 언어 kor
- 출판년 2021
- 발행사항 호서대학교 대학원
- 주제어 Gradeint Method 구배벡터 구조최적화 민감도 최적최하향법
- 참고문헌( 41)
유사주제 논문( 130)
- 민감도 117건
- 구조최적화 13건

인용/피인용

' 유한요소해석과 유한차분법을 이용한 최적최하향법의 구배 방향을 따르는 1차원 함수 도출 = Deriving One-Demensional Function along Gradient Direction for Optimal Steepest Descent Method using Finite Element Analysis and Finite Difference Method' 의 주제별 논문영향력

논문영향력 요약
동일주제 총논문수	논문피인용 총횟수	주제별 논문영향력의 평균
주제	Gradeint Method 구배벡터 구조최적화 민감도 최적최하향법
135	0	0.0%

논문영향력
주제		주제별 논문수	주제별 논문영향력
주제어	Gradeint Method	1	0.0%
	구배벡터	1	0.0%
	구조최적화	14	0.0%
	민감도	118	0.0%
	최적최하향법	1	0.0%
계		135	0.0%
* 다른 주제어 보유 논문에서 피인용된 횟수

' 유한요소해석과 유한차분법을 이용한 최적최하향법의 구배 방향을 따르는 1차원 함수 도출 = Deriving One-Demensional Function along Gradient Direction for Optimal Steepest Descent Method using Finite Element Analysis and Finite Difference Method' 의 참고문헌

[45] D. J. Inman, (2012), Engineering Vibration(K. H. Hwang., G. B. Lee., T. G. Jung., B. D. Lim., C, W. Ahn Trans), 3rd-edition, Korea: Pearson Education, p.333
D. J. InmanEngineering VibrationK. HG. BT. GB. D . Lim.C , W. Ahn3rd-edition , KoreaPearson Education [2012]
[3] TOSCA. Structure,(2009) User Manual, Vol 2, pp.507-590
TOSCA . Vol 2 [Structure2009]
[37] S. K. Azad and O. Hasancebi, (2014) An elitist self-adptive step-size search for structural design optimization, Applied Soft Computing, 19, pp.226-235
S. K. AzadO. Hasancebi Applied Soft Computing19 , pp.226-235 [2014]
[32] S. J. Lee. and J. E. Bae, (2007) The natural frequency maximization of beam structures by using modal strain energy based topology optimization technique, Journal of the Korean Association for Spatial Structure, 7(4) pp. 89-95
S. J. LeeJ. E. Bae Journal of the Korean Association for Spatial Structure7 ( 4 ) pp . 89-95 [2007]
[29] T. C. Sun. (1996) Design sensitivity analysis and optimization of nonlinear dynamic response for a motorcycle driving on a half-sine bump road, Structural Optimization 11, pp. 113-119
T. C. Sun Structural Optimization 11 , pp . 113-119 [1996]
[28] M. E. M. EI-Sayed and C. K Hsing. (1991) Design optimization with parallel sensitivity analysis on the CRAY X-MP, Structural Optimization, 3, pp. 247-251
M. E. M. EI-SayedC. K Hsing Structural Optimization , 3 , pp . 247-251 [1991]
[23] L. A. Schimt, (1981) Structure synthesis-its genesis and development, Journal of AIAA, 19(1), pp.1249-1263
L. A. Schimt Journal of AIAA19 ( 1 ) , pp.1249-1263 [1981]
[21] W. Prager and R. T. Shied, (1968) Optimal design of multi-purpose structures, Int. Journal of Solids and Structure, 4, pp. 469-475
W. PragerR. T. Shied Int . Journal of Solids andStructure , 4 , pp . 469-475 [1968]
[18] B. C. Koh, J. M. Choi., J. S. Koo. and O. G. Kwon, (1991) Sensitivity analysis for optimal structural design, Korea Institute of Machinery and Materials p.14
B. C. KohJ. M . Choi.J. S. KooO. G. Kwon Korea Institute of Machinery and Materials p.14 [1991]
Thirty years of modern struvtural optimization
G. N. Vanderplaate Advances in Engineering Software 16 [1993]
Structural optimization for statics , dynamics and beyond
G. N. Vanderplaats Journal of the Brazilian Society of Mechanical Sciences and Engineering28 ( 3 ) , pp.316-322 [2006]
Sensitivity analysis of finite element-based equilibrium problems using Pad ? approximants
S. K. Kwon [1990]
S. K. KwonA study on the transient response and impact coefficient calculation of PCB handler
B. H . Lee.M. S. Koh Journal of Digital Convergence15 ( 7 ) , pp.223-229 [2017]
S. K. Kown and C. N. Kim ,
M. S . Koh. [2019]
Problems of optimal structural design
W. PragerJ. E. Taylor Journal of Applied Mechanics85 ( 1 ) , pp . 102-106 [1985]
On the steepest descent algorithm for quadratic functions . Computational Optimization and Applications
Gonzaga , C. C.Schneider , R. M. 63 ( 2 ) , pp.523 ? 542 [2015]
On making thins the best-Aeronautical uses of optimization
H. Ashely AIAA Journal of Aircraft18 , pp.5-28 [1982]
Numerical methods for unconstrained optimum design : Introduction to optimum design
J. S. Arora pp.287-288 [2004]
Numerical methods for engineers
Steven C. ChapraRaymond P. CanaleD. Shin
Numerical Method for Engineers
S. C. ChapraR. P. Canale 4th edition , McGrawHill , pp.337-362 [2002]
New inexact line search method for unconstrained optimization
Z. J. ShiJ. Shen Journal of Optimization Theory and Application127 ( 2 ) , pp.425-446 [2005]
M. J. Kochenderfer and T. A. WheelerAlgorithms for Optimization
[2020]
Korea Institute of Machinery and MaterialsSensitivity analysis for optimal structural design ( Ministry of Science and ICT
[1991]
Introductory CAE training with experts ? Ch7
S. J. Min Understanding optimal deign , MIDAS Information Technology Co. , Ltd [2017]
High-quality approximations of eigenvalues in structural optimization
R. A . Canfield. Journal of AIAA28 ( 6 ) , pp.1116-1122 [1990]
H. W. Zhang and R. W. Grandi
Y. X. GuB. S. Chen Struct Multidisc Optimization 24 , pp.23-37 [2002]
Fundamentals , Technologies , Application , Economics
Erich , HauWind Turbines 2nd Edition , Berlin : Springer [2005]
Engineering optimization theory and practice ( H
Singiresu S. RapS . Bae. 4th edition , Korea : Hong Reung Science [2011]
Engineering optimization theory and practice
Singiresu S. RapHY . Kim.S . Bae. 4th editionSeoul : Hong Reung science [2011]
Efficient finite difference design sensitivities
U. KirschM. Bogomolni AIAA Journal43 ( 2 ) , pp.399-405 [2005]
Design Theory and Methods using CAD/CAE
K. H. Chang The computer aided engineering , Amsterdam : Elsevier , pp.134-139 [2015]
Computational aspects of sensitivity calculations in linear transient structural analysis
W. H. GreeneR. T. Haftka Structural Optimization , 3 , pp.176-201 [1991]
Computational aspects of sensitivity calculation in linear transient structural analysis
W. H. GreeneR. T. Haftka Structural Optimization , 3 , pp . 276-201 [1991]
Algorithms for Optimization
M. J. KochenderferT. A. Wheeler K. H. Lee Trans . ) Seoul : Acorn Publishing Co. pp [2020]
A study on development for wind turbine rotor hub using design of shape optimization
Y. I . Kim.S. Y . Moon.J. H . Lee.Y. S. LeeB. Y . Moon The KSFM Journal of Fluid Machinery14 ( 3 ) , pp.59-64 [2011]
A study for the dynamic characteristics and correlation with test result of gantry robot based on finite element analysis
M. S . Koh.S. K. KwonS. Lee Journal of Digital Convergence13 ( 1 ) , pp.269-274 [2015]
A stochastic Quasi-Newton method for large scale nonconvex optimization with applications
H . Chen.H. C . Wu.S. C . Chan.W. H. Lam IEEE Transaction on Neural Networks and Learning Systems , pp . 1-15 [2020]
A new unidimensional search method for optimization : Linear interpolation method
E. Kahya Applied Mathematics and Computation 171 , 912-926 [2005]
A new stepsize for the steepest descent method
Y. X. Yuan Journal of computational mathematics24 ( 2 ) , pp . 149-156 [2006]
A direct search optimization method that models the objective and constraint functions by linear interpolation
M .J . D. POWELL Advanced in Optimization and Numerical analysis , pp . 51-67 [1994]
1976 ) Approximation concepts for efficient structural synthesis
L. A. SchmitH. Miura NASA CR-2552

유한요소해석과 유한차분법을 이용한 최적최하향법의 구배 방향을 따르는 1차원 함수 도출 = Deriving One-Demensional Function along Gradient Direction for Optimal Steepest Descent Method using Finite Element Analysis and Finite Difference Method

유사주제 논문( 130)

주제별 논문영향력

' 유한요소해석과 유한차분법을 이용한 최적최하향법의 구배 방향을 따르는 1차원 함수 도출 = Deriving One-Demensional Function along Gradient Direction for Optimal Steepest Descent Method using Finite Element Analysis and Finite Difference Method' 의 참고문헌