___

• Bellman R, Casti J. Differential quadrature and long-term integration. Journal of Mathematical Analysis and Application 1971; 34: 235-238.
• Bellman R, Kashef, BG, Casti, J. Differential Quadrature: A technique for the rapid solution of nonlinear partial differential equation. Journal of Computational Physics 1972; 10: 52.
• Crandall, S.H., Engineering Analysis, A Survey of Numerical Procedures, McGraw-Hill, Book Company, New York, 1956.
• Bert CW, Jang SK, Striz AG. Two new approximate methods for analyzing free vibration of structural components. AIAA Journal 1987; 26 (5): 612-618.
• Bert CW, Wang Z, Striz AG. Differential quadrature for static and free vibration analysis of anisotropic plates. International Journal of Solids and Structure 1993;30(13):1737-1744.
• Bert CW, Malik M. Free vibration analysis of tapered rectangular plates by differential quadrature method: a semi- analytical approach. Journal of Sound and Vibration 1996;190(1): 63.
• Şuhubi, E.S., Sürekli Ortamlar Mekaniği-Giriş, İ.T.Ü. Yayınları, 1993, İstanbul.
• Bert CW, Malik M. Differential quadrature method in computational mechanics: a review. Applied Mechanics Review 1996;49(1):1-28.
• Bert CW, Wang Z, Striz AG. Static and free vibrational analysis of beams and plates by differential quadrature method. Acta Mechanica 1994;102:11-24.
• Björck A, and Pereyra V. Solution of vandermonde system of equations. Mathematical computing 1970; 24: 893-903.
• Civalek Ö. Finite Element analysis of plates and shells. Elazığ: Fırat University, 1998(in Turkish).
• Civalek Ö. Static, dynamic and buckling analysis of elastic bars using differential quadrature, XVI. National Technical Engineering Symposium. Ankara: METU, 2001.
• Civalek, Ö., Çatal, H.H., Plakların Diferansiyel Quadrature Metodu ile Stabilite ve Titreşim Analizi, IMO Teknik Dergi, 2003; Cilt 14, Sayı 1, 2835-2852.
• Ugural AC. Stress in plates and shells. Second Edition, Mc Graw Hill Companies, 1999.
• Leissa AW. The free vibration of rectangular plates. J. Sound and Vibration,1973;31: 93.
• Liew KM, Teo TM, and Han JB. Comparative accuracy of DQ and HDQ methods for three- dimensional vibration analysis of rectangular plates. International Journal for Numerical Methods in Engineering 1999; 45: 1831-1848.
• Du H, Lim MK, Lin, RM. Application of generalized differential quadrature method to structural problems. International Journal for Numerical Methods in Engineering 1994; :1881-1896.
• Shu C, Xue H. Explicit computations of weighting coefficients in the harmonic differential quadrature. Journal of Sound and Vibration 1997; 204(3): 549-555.
• Striz AG, Wang X, and Bert CW. Harmonic differential quadrature method and applications to analysis of structural components. Acta Mechanica 1995;111:85-94.
• Civan F, Sliepcevich CM. Application of differential quadrature to transport process. Journal of Mathematical Analysis and Applications 1983; 93: 206-221.
• Civan F, Sliepcevich CM. Differential quadrature for multi dimensional problems. Journal of Mathematical Analysis and Applications 1984;101: 423-443.
• Civan F, Sliepcevich CM. Solution of the Poisson equation by differential quadrature. International Journal for Numerical Methods in Engineering 1983; 19: 711-724.
• Altay Aşkar, G., Dökmeci, M.C., Some Variational Principles for linear coupled thermoelasticity, Int. J. Solids and Structures, 33(26); 3937-3948, 1996.
• Du H, Lim MK, Lin RM. Application of generalized differential quadrature method to vibration analysis. Journal of Sound and Vibration 1995;181(2):279-293.
• Du H, Liew KM, Lim MK. Generalized differential quadrature method for buckling analysis. Journal of Engineering Mechanic ASCE 1996; 22(2):95-100.
• Farsa J, Kukreti AR, Bert CW. Fundamental frequency analysis of laminated rectangular plates by differential quadrature method. International Journal for Numerical Methods in Engineering 1993;36: 2341-2356.
• Hamming RW. Numerical methods for scientists and engineers. New York: McGraw- Hill, 1973.
• Jang SK, Bert CW, Striz AG. Application of differential quadrature to static analysis of structural components. International Journal for Numerical Methods in Engineering 1989;28: 77.
• Aköz, Y., Değişim (Varyasyon Yöntemleri), Şekil Değiştirebilen Cisimler Mekaniği, K.T.Ü.,Trabzon, 1987.
• Sherbourne AN, Pandey MD. Differential quadrature method in the buckling analysis of beams and composite plates. Computers & Structures 1991;40(4):903-913.
• Shu C, Richards BE. Application of generalized differential quadrature to solve two- dimensional incompressible Navier -Stokes equations. International Journal for Numerical Methods in Fluids 1992;15:791-798.
• Shu C, Chew YT. On the equivalence of generalized differential quadrature and highest order finite difference scheme. Computer Methods in Applied Mechanics and Engineering ;155: 249-260. Quan JR, Chang CT. New insights in solving distributed system equations by the quadrature method-I analysis. Computers in Chemical Engineering 1989;13(7):779-788.
• Striz AG, Chen W, Bert CW. Static analysis of structures by the quadrature element method. International Journal of Solids and Structures 1994;31(20): 2807-2818.
• Timoshenko S, and Krieger WS. Theory of plates and shells. New York: 2nd Ed. McGraw-Hill, 1959.
• Liew KM, and Teo TM. Three dimensional vibration analysis of rectangular plates based on differential quadrature method. Journal of Sound and Vibration 1999; 220(4): 577
• Chen WL, Striz AG, and Bert CW. High-Accuracy plane stress and plate elements in the quadrature element method. International Journal of Solids and Structure 2000;37: 627-647.
• Wang, C.M., Liew, K.M., Xiang, Y. and Kitipornchai S., Buckling of rectangular Mindlin plates with internal line supports., International Journal of Solids and Structures, ,30, 1-17. Liew, K.M., Teo, T.M., and Han, J.-B., Three-dimensional solutions of rectangular plates by variant differential quadrature method, International Journal of Mechanical Sciences, ,43, 1611-1628,