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• Bellman, R., Casti, J., Differential quadrature and long-term integration, Journal of Mathematical Analysis and Application, 34, 235-38, 1971.
• Bellman, R., Kashef, B.G., Casti, J., Differential Quadrature: A technique for the rapid solution of nonlinear partial differential equation, Journal of Computational Physics, 10, 40-52, 1972.
• Bert, C.W., Malik, M., The differential quadrature method for irregular domains and application to plate vibration, International Journal of Mechanical Science, 38(6), 589-606, 1996.
• Bert, C.W., Jang, S.K., Striz, A.G., Two new approximate methods for analyzing free vibration of structural components, AIAA Journal, 26(5), 612-18, 1987.
• Bert, C.W., Wang, Z., Striz, A.G., Differential quadrature for static and free vibration analysis of anisotropic plates, International Journal of Solids and Structure, 30(13),1737-44, 1993.
• Bert, C.W., Malik, M., Free vibration analysis of tapered rectangular plates by differential quadrature method: a semi- analytical approach, Journal of Sound and Vibration, 190(1), 41-63, 1996.
• Bert, C.W., Wang, Z., Striz, A.G., Convergence of the DQ method in the analysis of an isotropic plates, Journal of Sound and Vibration, 170(1), 140-44, 1994.
• Bert, C.W., Malik, M., Differential quadrature method in computational mechanics: a review, Applied Mechanics Review, 49(1), 1-28, 1996.
• Bert, C.W., Wang, Z., Striz, A.G., Static and free vibrational analysis of beams and plates by differential quadrature method, Acta Mechanica,102, 11-24, 1994.
• Björck, A., Pereyra, V., Solution of Vandermonde system of equations, Mathematical computing, 24, 893-903, 1970.
• Civalek, O., Finite Element analysis of plates and shells, Elazığ: Fırat University (in Turkish), 1998.
• Shu, C., Xue, H., Explicit computations of weighting coefficients in the harmonic differential quadrature, Journal of Sound and Vibration, 204(3), 549-55, 1997.
• Liew, K.M., Teo, T.M., Three dimensional vibration analysis of rectangular plates based on differential quadrature method, Journal of Sound and Vibration, 220(4), 577-99, 1999.
• Timoshenko, S.P., Gere, J.M., Theory Elastic Stability, McGraw-Hill, Second Edition, Tokyo, 1959.
• Chajes, A., Principles of Structural Stability Theory, Prentice-Hall, New Jersey, 1974.
• Wang, X., Striz, A.G., Bert, C.W., Buckling and vibration analysis of skew plates by the differential quadrature method, AIAA Journal, 32(4), 886-889, 1994.
• Wang, X., Bert, C.W., Striz, A.G., Differential quadrature analysis of deflection, buckling and free vibration of beams and rectangular plates, Computers and Structures, 48(3), 473-479, 1993.
• Wei, G.W., A new algorithm for solving some mechanical problems, Comput. Methods Appl. Mech. Eng., 190, 2017-2030, 2001.
• Wei, G.W., Vibration analysis by discrete singular convolution, Journal of Sound and Vibration, 244, 535-553, 2001.
• Wei, G.W., Discrete singular convolution for beam analysis, Engineering Structures, 23, 1045-1053, 2001.
• Akgöz, B., Civalek, O., Effects of thermal and shear deformation on vibration response of functionally graded thick composite microbeams, Composites Part B: Engineering 129, 77-87, 2017.
• Civalek, O., Geometrically non-linear static and dynamic analysis of plates and shells resting on elastic foundation by the method of polynomial differential quadrature (PDQ), Fırat University, Elazığ, 2004.
• Civalek, O., Demir, C., Buckling and bending analyses of cantilever carbon nanotubes using the euler-bernoulli beam theory based on non-local continuum model, Asian Journal of Civil Engineering, 12(5), 651-661, 2011.
• Akgoz, B., Civalek, O., Nonlinear vibration analysis of laminated plates resting on nonlinear two-parameters elastic foundations, Steel and Composite Structures, 11(5), 403-421, 2011.
• Civalek, O., Acar, M.H., Discrete singular convolution method for the analysis of Mindlin plates on elastic foundations, International Journal of Pressure Vessels and Piping, 84(9), 527-535, 2007.
• Civalek, O., Yavas, A., Large deflection static analysis of rectangular plates on two parameter elastic foundations, International journal of science and technology, 1(1), 43-50, 2006.
• Civalek, O., Kiracioglu, O., Free vibration analysis of Timoshenko beams by DSC method, International Journal for Numerical Methods in Biomedical Engineering, 26(12), 1890-1898, 2010.
• Demir, C., Civalek, O., A new nonlocal FEM via Hermitian cubic shape functions for thermal vibration of nano beams surrounded by an elastic matrix, Composite Structures, 168, 872-884, 2017.
• Mercan, K., Demir, C., Civalek, O., Vibration analysis of FG cylindrical shells with power-law index using discrete singular convolution technique, Curved and Layered Structures, 3(1), 82-90, 2016.
• Demir, C., Civalek, O., On the analysis of microbeams, International Journal of Engineering Science, 121, 14-33, 2017.
• Civalek, O., Geometrically nonlinear dynamic and static analysis of shallow spherical shell resting on two-parameters elastic foundations, International Journal of Pressure Vessels and Piping, 113, 1-9, 2014.