Open Access
Issue
E3S Web Conf.
Volume 496, 2024
International Conference on Energy, Infrastructure and Environmental Research (EIER 2024)
Article Number 02004
Number of page(s) 7
Section Engineering Physics and Computational Technologies
DOI https://doi.org/10.1051/e3sconf/202449602004
Published online 12 March 2024
  1. Y. Fukui. Fundamental investigation of functionally graded materials manufacturing system using centrifugal force. JSME International Journal, Series 3, 34, pp. 144–148, 1991. [Google Scholar]
  2. A.C. Eringen and D. Edelen. On nonlocal elasticity, International Journal of Engineering Science, 10 (3), pp. 233–248, 1972. [CrossRef] [Google Scholar]
  3. A.C. Eringen. Nonlocal Continuum Field Theories, Springer-Verlag, New York, 2002. [Google Scholar]
  4. A.C. Eringen. On differential equations of nonlocal elasticity and solutions of screw dislocation and surface waves. Journal of Applied Physics, 54, pp. 4703-4710, 1983. [CrossRef] [Google Scholar]
  5. J.N. Reddy. Nonlocal theories for bending, buckling and vibration of beams. International Journal of Engineering Science, 45, pp. 288-307, 2007. [CrossRef] [Google Scholar]
  6. M. Aydogdu. A general nonlocal beam theory: Its application to nanobeam bending, buckling and vibration. Physica E, 41, pp. 1651–1655, 2009. [CrossRef] [Google Scholar]
  7. Eltaher, M.A., Emam S.A. and Mahmoud, F.F. Free vibration analysis of functionally graded size-dependent nanobeams. Applied Mathematics and Computation, 218(14), pp.7406-7420, 2012. [CrossRef] [Google Scholar]
  8. M.A. Eltaher, A.E. Alshorbagy and F.F. Mahmoud. Vibration analysis of Euler–Bernoulli nanobeams by using finite element method. Applied Mathematical Modeling, 37(7), pp. 4787-4797, 2013. [CrossRef] [Google Scholar]
  9. Rahmani , O., Pedram O., Analysis and modeling the size effect on vibration of functionally graded nanobeams based on nonlocal Timoshenko beam theory. Int. J. Eng. Sci., 77, pp. 55–70, 2014. [CrossRef] [Google Scholar]
  10. A. Zemri, M.S.A. Houari, A.A. Bousahla, A. Tounsi. A mechanical response of functionally graded nanoscale beam: an assessment of a refined nonlocal shear deformation theory beam theory, Struct. Eng. Mech., 54, 693–710, 2015. [CrossRef] [Google Scholar]
  11. Huu-Tai Thai, Thuc P. Vo, Trung-Kien Nguyen, Seung-Eock Kim. A review of continuum mechanics models for size-dependent analysis of beams and plates, Composite Structures, 177, pp. 196–219, 2017. [CrossRef] [Google Scholar]
  12. Nejad M. Z., Hadi A., Eringen’s non-local elasticity theory for bending analysis of bi-directional functionally graded Euler-Bernoulli nano-beams, Int. J. Eng. Sci., 106, pp. 1-9, 2016. [CrossRef] [Google Scholar]
  13. Isa Ahmadi, Vibration analysis of 2D-functionally graded nanobeams using the nonlocal theory and meshless method. Eng. Anal. Boundary Elem., 124, pp. 142-154, 2021. [CrossRef] [Google Scholar]

Current usage metrics show cumulative count of Article Views (full-text article views including HTML views, PDF and ePub downloads, according to the available data) and Abstracts Views on Vision4Press platform.

Data correspond to usage on the plateform after 2015. The current usage metrics is available 48-96 hours after online publication and is updated daily on week days.

Initial download of the metrics may take a while.