References
- Adams RD, Wake WC. Structural adhesive joints in engineering. London: Elsevier; 1984.
- Kinloch AJ. Adhesion and adhesives. London: Chapman & Hall; 1987.
- Zachary LW, Burger CP. Dynamic wave propagation in a single lap joint. Exp. Mech. 1980;20:162–166.
- Ko TC, Lin CC, Chu RC. Vibration of bonded laminated lap-joint plates using adhesive interface elements. J. Sound Vib. 1995;184:567–583.
- Higuchi I, Sawa T, Okuno H. Three-dimensional finite element analysis of stress response in adhesive butt joints subjected to impact tensile loads. J. Adhesion. 1999;69:59–82.
- Higuchi I, Sawa T, Okuno H, et al. Three-dimensional finite element analysis of stress response in adhesive butt joints subjected to impact bending moments. J. Adhesion. 2003;79:1017–1039.
- Sato C, Ikegami K. Dynamic deformation of lap joints and scarf joints under impact loads. Int. J. Adhes. Adhes. 2000;20:17–25.
- Sawa T, Suzuki Y, Kido S. FEM stress analysis and strength of adhesive butt joints of similar hollow cylinders under static and impact tensile loadings. J. Adhesion Sci. Technol. 2002;16:1449–1468.
- Vaidyaa UK, Gautam ARS, Hosur M, et al. Experimental-numerical studies of transverse impact response of adhesively bonded lap joints in composite structures. Int. J. Adhes. Adhes. 2006;26:184–198.
- Apalak MK, Yildirim M. Free vibration analysis and optimal design of a clamped-free single lap joint with unidirectional laminated narrow plates. J. Thermoplast. Compos. Mater. 2009;22:183–211.
- Apalak MK, Yildirim M. Effect of adhesive thickness on transverse low-speed impact behavior of adhesively bonded similar and dissimilar clamped plates. J. Adhes. Sci. Technol. 2011;25:2587–2613.
- Dorduncu M, Apalak MK. Stress wave propagation in similar and dissimilar adhesively bonded circular cylinders. J. Adhes. Sci. Technol. 2015;29:778–806.
- Koizumi M. FGM activities in Japan. Compos. Part B: Eng. 1997;7:1–4.
- Chiu TC, Erdogan F. One-dimensional wave propagation in a functionally graded elastic medium. J. Sound Vib. 1999;222:453–487.
- Han X, Xu D, Liu GR. Transient responses in a functionally graded cylindrical shell to a point load. J. Sound Vib. 2001;251:783–805.
- Santare MH, Thamburaj P, Gazonas GA. The use of graded finite elements in the study of elastic wave propagation in continuously nonhomogeneous materials. Int. J. Solids Struct. 2003;40:5621–5634.
- Sofiyev AH. Dynamic buckling of functionally graded cylindrical thin shells under non-periodic impulsive loading. Acta Mech. 2003;165:151–163.
- Sofiyev AH. The stability of functionally graded truncated conical shells subjected to aperiodic impulsive loading. Int. J. Solids Struct. 2004;41:3411–3424.
- Sofiyev AH. The buckling of functionally graded truncated conical shells under dynamic axial loading. J. Sound Vib. 2007;305:808–826.
- Gunes R, Apalak MK, Yildirim M. The free vibration analysis and optimal design of an adhesively bonded functionally graded single lap joint. Int. J. Mech. Sci. 2007;49:479–499.
- Gunes R, Apalak MK, Yildirim M, et al. Free vibration analysis of adhesively bonded single lap joints with wide and narrow functionally graded plates. Compos. Struct. 2010;92:1–17.
- Aksoy HG, Senocak E. Wave propagation in functionally graded and layered materials. Finite Elem. Anal. Des. 2009;45:876–891.
- Sun D, Luo SN. Wave propagation and transient response of functionally graded material circular plates under a point impact load. Compos. Part B: Eng. 2011;42:657–665.
- Pradhan KK, Chakraverty S. Free vibration of Euler and Timoshenko functionally graded beams by Rayleigh--Ritz method. Compos. Part B: Eng. 2013;53:175–184.
- Dorduncu M, Apalak MK, Cherukuri HP. Elastic wave propagation in functionally graded circular cylinders. Compos. Part B: Eng. 2013;73:35–48.
- Cherukuri HP, Shawki TG. A finite-difference scheme for elastic wave propagation in a circular disk. Acoust. Soc. Am. 1996;100:2139–2155.
- Mori T, Tanaka K. Average stress in matrix and average elastic energy of materials with misfitting inclusions. Acta Metall. 1973;21:571–574.
- Benveniste Y. A new approach to the application of Mori--Tanaka’s theory in composite materials. Mech. Mater. 1987;6:147–157.
- Timoshenko S, Goodier JN. Theory of elasticity. New York (NY): McGraw-Hill; 1970.
- Graff KF. Wave motion in elastic solids. New York (NY): Dover; 1975.
- Achenbach JD. Wave propagation in solids. New York (NY): Elsevier; 1976.
- Davis JL. Mathematics of wave propagation. Princeton (NJ): Princeton University Press; 2000.
- Alterman Z, Karal FC. Propagation of elastic waves in layered media by finite difference methods. Bull. Seismol. Soc. Am. 1968;5:367–398.
- Ilan A, Loewenthal D. Instability of finite difference schemes due to boundary conditions in elastic media. Geophys. Prospect. 1976;24:431–453.