---

Journal of Environmental Accounting and Management 8(2) (2019) 167--187 | DOI:10.5890/JAND.2019.06.002

Babatope Omolofe$^{1}$, Alimi Adedowole$^{2}$

$^{1}$ Department of Mathematical Sciences, School of Sciences, Federal University of Technology, PMB 704, Akure, Ondo State, Nigeria

$^{2}$ Department of Mathematical Sciences, Faculty of Sciences, Adekunle Ajasin University, Akungba-Akoko, Ondo State, Nigeria

Download Full Text PDF

 

Abstract

This paper investigates the dynamic response of a simply-supported uniform beam resting on elastic subgrade and subjected to travelling distributed load. A robust mathematical procedure is developed to treat this vibrating system problem. In particular, the Mindlin and Goodman’s technique in the first instance is used to transform the non-homogeneous fourth order partial differential equations with governing non-homogeneous boundary conditions into non-homogeneous fourth order partial differential equations with homogeneous boundary conditions and then the resulting transformed equation is then further treated using the versatile generalized integral transform with the series representation of the Heaviside function and a modification of Struble’s asymptotic method. Analytical solution was obtained for the dynamic response of the uniform elastic beam. Analytical and Numerical calculations give important results which is very useful in structural design and engineering analysis.

References

1. [1]	Krylov, A.N. (1905), Mathematical collection of papers of the academy of sciences, 61

2. [2]	Saller, H. (1921), Einfluss bewegter last aut Eisendanober bauund Briken, Kreidel Vertary Beruin

3. [3]	Jeffcot, H.H. (1929), On the vibration of beam under the action of moving loads, Philosophy Magazine ser. 7.8 No. 48, 66-67.

4. [4]	Fryba, L. (1972), Vibration of solids and structures under moving loads, International Publishing Groningen, The Netherlands.

5. [5]	Stanisic, M.M., Euler, J.A., and Montgomeny, S.T. (1974), On a theory concerning the dynamical behaviour of structures carrying masses, Ing. Archiv, 43, 295-4305.

6. [6]	Esmailzadeh, E. and Ghorashi, M. (1995), Vibration analysis of beams traverse by uniform partially distributed moving masses, Journal of Sound and Vibration, 184(1), 9-17.

7. [7]	Esmailzadeh, E. and Ghorashi, M. (1997), Vibration analysis of Timoshenko beams subjected to traveling mass, Journal of Sound and Vibration, 199(4), 615-628.

8. [8]	Oni, S.T. and Awodola, T.O. (2005), Dynamic behaviour of non-uniform Bernoulli-Euler beams subjected to concentrated loads travelling at varying velocities, Journal of the Nigerian Association of Mathematical Physics , 9(2), 151-162.

9. [9]	Oni, S.T. and Omolofe, B. (2005), Dynamic behaviour of non-uniform Bernoulli-Euller beams subjected to concentrated loads travelling at varying velocities, Journal of the Nigerian Association of Mathematical Physics, 9(2), 79-102.

10. [10]	Ogunyebi, S.N. (2006), Dynamical Analysis of finite prestressed Bernoulli-Euler beam with general boundary conditions under travelling distributed loads Federal University of Technology, Akure, Nigeria M.Sc. Dissertation.

11. [11]	Oni, S.T. and Adedowole, A. (2008), Influence of prestress on the response to moving loads of rectangular plates incorporating rotatory inertia correction factor Journal of the Nigerian Association of Mathematical physics, 13, 127-140.

12. [12]	Hsu, J.C., Lai, H.Y., and Chen, C.K (2008), Free Vibration of non-uniform Euler-Bernoulli beams with general elastically end constraints using Adomian modified decomposition method, Journal of Sound and Vibration, 318, 965-981.

13. [13]	Oni, S.T. and Ogunyebi, S.N (2008), Dynamical analysis of a prestressed elastic beam with general boundary conditions under the action of uniform distributed masses, Journal of the Nigerian Association of Mathematical physics, 12, 87-102.

14. [14]	Shahin, N.A. and Mbakisya, O (2010), Simply supported beam response on elastic foundation carrying repeated rolling concentrated loads, Journal of Engineering Science and Technology, 5(1), 52-66.

15. [15]	Zolkiewski, S. (2010), Numerical application for dynamical analysis of rod and beam systems in transportation, Solid State Phenomena, 164, 343-348.

16. [16]	Ghugal, Y.M. and Sayyad, S.A. (2011), Free vibration of thick orthotropic plates using trigonometric shear deformation theory, Latin America Journal of solid and structure, 8, 229-243.

17. [17]	Shahidi, M., Bayat, M., Pakar, I., and Abdollahzadeh, G. (2011), On the solution of free non-linear vibration of beams, nt.J. Phys. Sci, , Applied Mathematical Sciences, no. 6(7), 1628-1634.

18. [18]	Zolkiewski, S. (2011), Damped vibrations problem of beams fixed on the rotational disk, International Journal of Bifurcation and Chaos, 21(10), 3033-3041.

19. [19]	Nikkhoo, A. and Rofooei, F.R. (2012), Parametric study of the dynamic response of thin rectangular plates traversed by a moving mass, Acta Mechanica, 223(1), 39-57.

20. [20]	Slawomir, Z. (2013), Vibrations of beams with a variable cross-section fixed on rotational rigid disks, Latin American Journal of Solids and Structures, 10, 125-142.

21. [21]	Zarfam, R., Khaloo, A.R., and Nikkhoo, A. (2013), On the response spectrum of Euler-Bernoulli beams with a moving mass and horizontal support excitation, Mechanics Research Communications, 47, 77-83.

22. [22]	Saravi, M., Hermaan, M., and Ebarahimi, K.H., The comparison of homotopy perturbation method with finite difference method for determination of maximum beam deflection, Journal of Theoretical and Applied Physics, 7, 8, DOI: 10.1186/2251-7235-7-8.

23. [23]	Wanshu, H., Sujing, Y., and Lin, M, (2014), Vibration of vehicle-bridge coupling system with measured correlated road surface roughness, Structural Engineering and Mechanics an International Journal, 51(2),315-331.

24. [24]	Murat, A. (2014), Large deflection analysis of point supported-elliptical plates Structural Engineering and Mechanics an International Journal, 51(2), 333-347.

25. [25]	Li, R., Zhong, Y., and Li, M.L. (2015), Analytic bending solutions of free rectangular thin plates resting on elastic foundations by a new symplectic superposition method, Proceedings of the Royal Society, A, 46, 468-474.

26. [26]	Omolofe, B. and Oni, S.T. (2015), Transverse motions of rectangular plates resting on elastic foundation and under concentrated masses moving at varying velocities, Latin America Journal of Solid and Structures, 12, 1296-1318.

27. [27]	Stanisic, M.M. (1985), On a new theory of the dynamic behaviour of the structures carrying moving masses, Archive of Applied Mechanics, 55(3), 176-185.

28. [28]	Pesterev, A.V., Yang, B., and Bergman, L.A. (2001), Response of elastic continuum carrying multiple moving oscillators, Journal of Engineering Mechanics, 127(3), 260-265.

29. [29]	Wu, J.J. (2005), Vibration analysis of beams traversed by uniform partially distributed moving masses using moving mass element, Int. Journal for Numerical methods in Engineering, 62, 2028-2052.

30. [30]	Sun, L and Luo, L. (2008), Steady-state dynamic response of a Bernoulli-Euler beam on a viscoelastic foundation subject to a platoon of moving dynamic loads, Journal of Vibration and Acoustics, 130, 1-21.

31. [31]	Ugurlu, B., Kutlu, A., Ergin, A., and Omurtag, M. H. (2008), Dynamics of a rectangular plate resting on an elastic foundation and partially in contact with a quiescent fluid, Journal of sound and Vibration, 317, 308-328.

32. [32]	Oni, S.T. and Omolofe, B. (2011), Vibration analysis of non-prismatic beam resting on elastic subgrade and under the actions of accelerating masses, Journal of the Nigerian Mathematical Society, 30, 63-109.

33. [33]	Amin, B. (2011), Non-linear vibration of Euler-Bernoulli beams, Latin America Journal of Solid and Structures, 8(2), 139-148.

34. [34]	Ali, R.D., Mahdi, B., Hassan, G., and Mesbah, S. (2013), Boundary Element Method applied to the bending analysis of thin functionally graded plates, Latin America Journal of Solid and Structures, 10(3), 549-570.

35. [35]	Azam, S.E., Mofid, M., and Khoraskani, R.A. (2013), Steady-state dynamic response of a Bernoulli-Euler beam on a viscoelastic foundation subject to a platoon of moving dynamic loads, Journal of Vibration and Acoustics, 20(1), 50-56.

36. [36]	Juan, L., Bailin, Z., Qing, Y., and Xingjian, H. (2014), Analysis on time-dependent behavior of laminated functionally graded beams with viscoelastic interlayer, Composite Structures, 107, 30-35.

37. [37]	Keivan, K., Hamidreza, G., and Ardeshir, N. (2015), On the role of shear deformation in dynamic behaviour of a fully saturated poroelasticbeam traversed by a moving load, International Journal of Mechanical Sciences, 94-95, 84-95.

38. [38]	Omolofe, B. and Adeloye, T.O. (2017), Behavioral study of finite beam resting on elastic foundation and subjected to travelling distributed masses, Latin America Journal of Solid and Structures, 14, 312-334.

39. [39]	Omolofe, B. and Ogunyebi, S.N., (2016), Dynamic characteristics of a rotating Timoshenko beam subjected to a variable magnitude load travelling at varying speed, Journal of the Korean Society for Industrial and Applied Mathematics, 20(1), 17-35.

40. [40]	Wei, J., Cao, D., Yang, Y., and Huang, W., (2017), Nonlinear dynamical modeling and vibration responses of an L-Shaped beam-mass structure, Journal of Applied nonlinear dynamics, 6(1), 91-104.

41. [41]	Timoshenko, S., Young, D.H. and Weaver, W. (1974), Vibration problems in Engineering, Fourth Edition, pp. 448-453.

42. [42]	Mindlin, R.D. and Goodman, L.E. (1950), Beam vibration with time-dependent boundary condition J.Appl. Mech., 17, 377-380.

43. [43]	Masri, S.F. (1976), Response of beams to propagating boundary excitation, Earthquake Engineering and Structural Dynamics, 4, 497-509.

44. [44]	Oni, S.T. and Ajibola, S.O. (2011), Motion of moving concentrated loads on a simply-supported non-uniform Rayleigh beams with non-classical boundary conditions, Journal of the Nigerian Association of Mathematical Physics, 18, 45-52.