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다국어 초록 (Multilingual Abstract)

In this paper, a new and simplified method is presented in which the natural frequencies of the uniform and non-uniform beams are calculated through simple mathematical relationships. The various vibration problems such as: Rayleigh beam under variable axial force, axial vibration of a bar with and without end discrete spring, torsional vibration of a bar with an attached mass moment of inertia, flexural vibration of the beam with laterally distributed elastic springs and also flexural vibration of the beam with effects of viscose damping are investigated. The governing differential equations are first obtained and then; according to a harmonic vibration, are converted into single variable equations in terms of location. Through repetitive integrations, the governing equations are converted into weak form integral equations. The mode shape functions of the vibration are approximated using a power series. Substitution of the power series into the integral equations results in a system of linear algebraic equations. The natural frequencies are determined by calculation of a non-trivial solution for system of equations. The efficiency and convergence rate of the current approach are investigated through comparison of the numerical results obtained with those obtained from other published references and results of available finite element software.

참고문헌 (Reference)

1 Li, X. F., "Vibration of a Rayleigh cantilever beam with axial force and tip mass" 80 : 15-22, 2013

2 Wright, A. D., "Vibration modes of centrifugally stiffened beams" 49 (49): 197-202, 1982

3 D.V. Bambill, "Vibration analysis of rotating Timoshenko beams by means of the differential quadrature method" 국제구조공학회 34 (34): 231-245, 2010

4 Maiz, S., "Transverse vibration of Bernoulli-Euler beams carrying point masses and taking into account their rotatory inertia: exact solution" 303 (303): 895-908, 2007

5 Li, Q. S., "Torsional vibration of multi-step non-uniform rods with various concentrated elements" 260 (260): 637-651, 2003

6 Pouyet, J.M., "Torsional vibration of a shaft with non-uniform cross-section" 76 (76): 13-22, 1981

7 Rayleigh, L., "Theory of Sound" Macmillan 1877

8 Chalah, F., "Tapered beam axial vibration frequency: linear cross-area variation case" 2013

9 Saapountzakis, E. J., "Solutions of non-uniform torsion of bars by an integral equation method" 77 (77): 659-667, 2000

10 E.J. Sapountzakis, "Shear deformation effect in flexural-torsional buckling analysis of beams of arbitrary cross section by BEM" 국제구조공학회 35 (35): 141-173, 2010

1 Li, X. F., "Vibration of a Rayleigh cantilever beam with axial force and tip mass" 80 : 15-22, 2013

2 Wright, A. D., "Vibration modes of centrifugally stiffened beams" 49 (49): 197-202, 1982

3 D.V. Bambill, "Vibration analysis of rotating Timoshenko beams by means of the differential quadrature method" 국제구조공학회 34 (34): 231-245, 2010

4 Maiz, S., "Transverse vibration of Bernoulli-Euler beams carrying point masses and taking into account their rotatory inertia: exact solution" 303 (303): 895-908, 2007

5 Li, Q. S., "Torsional vibration of multi-step non-uniform rods with various concentrated elements" 260 (260): 637-651, 2003

6 Pouyet, J.M., "Torsional vibration of a shaft with non-uniform cross-section" 76 (76): 13-22, 1981

7 Rayleigh, L., "Theory of Sound" Macmillan 1877

8 Chalah, F., "Tapered beam axial vibration frequency: linear cross-area variation case" 2013

9 Saapountzakis, E. J., "Solutions of non-uniform torsion of bars by an integral equation method" 77 (77): 659-667, 2000

10 E.J. Sapountzakis, "Shear deformation effect in flexural-torsional buckling analysis of beams of arbitrary cross section by BEM" 국제구조공학회 35 (35): 141-173, 2010

11 Hijmissen, J.W., "On transverse vibrations of a vertical Timoshenko beam" 314 (314): 161-179, 2008

12 Timoshenko, S. P., "On the transverse vibrations of bars of uniform cross-section" 43 (43): 125-131, 1922

13 Timoshenko, S. P., "On the correction for shear of the differential equation for transverse vibration of prismatic bars" 41 (41): 744-746, 1921

14 Huang, Y., "Free vibration of axially functionally graded Timoshenko beams with non-uniform cross-section" 45 (45): 1493-1498, 2013

15 Banerjee, J.R., "Free vibration of a rotating tapered Rayleigh beam: a dynamic stiffness method of solution" 124 : 11-20, 2013

16 Pradhan, K.K., "Free vibration of Euler and Timoshenko functionally graded beams by Rayleigh-Ritz method" 51 : 175-184, 2013

17 H. Saffari, "Free vibration analysis of non-prismatic beams under variable axial forces" 국제구조공학회 43 (43): 561-582, 2012

18 Stojanovic, V., "Forced transverse vibration of Rayleigh and Timoshenko double-beam system with effect of compressive axial load" 60 (60): 59-71, 2012

19 Yesilce, Y., "Effect of axial force on free vibration of Timoshenko multi-span beam carrying multiple spring-mass systems" 50 (50): 995-1003, 2008

20 Clough, R.W., "Dynamics of Structures" McGraw-Hill Book Company 1975

21 Yusuf Yesilce, "Differential transform method and numerical assembly technique for free vibration analysis of the axial-loaded Timoshenko multiple-step beam carrying a number of intermediate lumped masses and rotary inertias" 국제구조공학회 53 (53): 537-573, 2015

22 Yan, S. X., "Bending vibration of rotating tapered cantilevers by the integral equation method" 49 (49): 872-876, 2011

23 Kelly, S. G., "Advanced Vibration Analysis" CRC Press 2007

24 Huang, Y., "A new approach for free vibration of axially functionally graded beams with non-uniform cross-section" 329 : 2291-2303, 2010

연월일	이력구분	이력상세
2022	평가예정	해외DB학술지평가 신청대상 (해외등재 학술지 평가)
2021-12-01	평가	등재후보 탈락 (해외등재 학술지 평가)
2020-12-01	평가	등재후보로 하락 (해외등재 학술지 평가)
2011-01-01	평가	등재학술지 유지 (등재유지)
2009-01-01	평가	등재학술지 유지 (등재유지)
2007-04-09	학회명변경	한글명 : (사)국제구조공학회 -> 국제구조공학회
2007-01-01	평가	등재학술지 유지 (등재유지)
2005-06-16	학회명변경	영문명 : Ternational Association Of Structural Engineering And Mechanics -> International Association of Structural Engineering And Mechanics
2005-05-26	학술지명변경	한글명 : 국제구조계산역학지 -> Structural Engineering and Mechanics, An Int'l Journal
2005-01-01	평가	등재학술지 유지 (등재유지)
2002-01-01	평가	등재학술지 선정 (등재후보2차)
1999-01-01	평가	등재후보학술지 선정 (신규평가)

기준연도	WOS-KCI 통합IF(2년)	KCIF(2년)	KCIF(3년)
2016	1.12	0.62	0.94
KCIF(4년)	KCIF(5년)	중심성지수(3년)	즉시성지수
0.79	0.68	0.453	0.33

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A new analytical approach for determination of flexural, axial and torsional natural frequencies of beams

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