a análise de placas laminadas compostas inteligentes
a análise de placas laminadas compostas inteligentes a análise de placas laminadas compostas inteligentes
Referências bibliográficas 184 REDDY, J. N. A simple higher-order theory for laminated composite plates. Journal of Applied Mechanics, v. 51, p. 745 - 752, 1984. REDDY, J. N. Mechanics of laminated composite plates. 2. ed. Boca Raton: CRC Press, 1997. REDDY, J. N. On laminated composite plates with integrated sensors and actuators. Engineering Structures, v. 21, p. 568 - 593, 1999. REDDY, J. N. Mechanics of laminated composite plates and shells: theory and analysis. Boca Raton: CRC Press, 2004. ODEN, J. T.; REDDY, J. N. An introduction to the mathematical theory of Finite Ele- ments. New York, John Wiley and Sons, 1976. REISSNER, E. On transverse bending of plates, including the effects of transverse shear deformation. International Journal of Solids and Structures, v. 11, p. 569 - 573, 1975. ROCHA, T. L. Modelagem de estruturas inteligentes. Dissertação (Mestrado) - Universi- dade Estadual Paulista, Ilha Solteira, 2004. SARAVANOS, D. A. Mixed laminate theory and finite element for smart piezoelectric composite shell structures. American Institute of Aeronautics and Astronautics Journal, v. 35, p. 1327 - 1333, 1997. SARAVANOS, D. A.; HEYLIGER, P. R.; HOPKINS, D. A. Layerwise mechanics and finite element for the dynamic analysis of piezoelectric composite plates. International Journal for Solids and Structures, v. 34, n. 3, p. 359 - 378, 1997. SHIMPI, R. C. Zeroth-order shear deformation theory for plates. American Institute of Aeronautics and Astronautics Journal, v. 37, p. 524 - 526, 1998. SORIANO, H. L. Método de Elementos Finitos em análise de estruturas. São Paulo: Edusp, 2003.
Referências bibliográficas 185 STROUBOULIS, T.; BABU ˇ SKA, I.; COPPS, K. The desing and analysis of the gene- ralized finite element method. Computer Methods in Applied Mechanics and Engineering, v. 181, p. 43 - 69, 2000. SUN, D.; TONG, L.; WANG, D. An incremental algorithm for static shape control of smart structures with nonlinear piezoelectric actuators. International Journal of Solids and Structures, v. 41, p. 2277 - 2292, 2004. SZE, K. Y.; PAN, Y. S. Hybrid finite element models for piezoelectric materials. Journal of Sound and Vibration, v. 226, n. 3, p. 519 - 547, 1999. TORRES, I. F. R. Desenvolvimento e aplicação do Método dos Elementos Finitos Gene- ralizados em análise tridimensional não-linear de sólidos. Tese (Doutorado) - Escola de Engenharia de São Carlos, Universidade de São Paulo, São Carlos, 2003. TZOU, H. S.; TSENG, C. I. Distributed piezoelectric sensor/actuator design for dynamic measurement/control of distributed parameter systems: a piezoelectric finite element ap- proach. Journal of Sound and Vibration, v. 138, p. 17 - 34, 1990. TZOU, H. S.; YE, R. Analysis of piezoelastic structures with laminated piezoelectric triangle shell elements. American Institute of Aeronautics and Astronautics Journal, v. 34, n. 1, p. 110 - 115, 1996. VEL, S. S.; BATRA, R. C. Exact solution for the cylindrical bending of laminated plates with embedded piezoelectric shear actuators. Smart Materials and Structures, v. 10, p. 240 - 251, 2001. WHITNEY, J. M.; SUN, C. T. A refined theory for laminated anisotropic cylindrical shells. Journal of Applied Mechanics, v. 41, n. 2, p. 471 - 476, 1974. ZHEN, W.; WANJI, C. Refined global-local higher order theory and finite element for laminated plates. International Journal for Numerical Methods in Engineering, v. 69, p. 1627 - 1670, 2007.
- Page 152 and 153: 7.4 Equações do movimento em term
- Page 154 and 155: 7.5 Solução de Navier 136 à toda
- Page 156 and 157: 7.5 Solução de Navier 138 Ny =
- Page 158 and 159: 7.5 Solução de Navier 140 A11 + L
- Page 160 and 161: 7.5 Solução de Navier 142 nas equ
- Page 162 and 163: 7.5 Solução de Navier 144 ∞ ∞
- Page 164 and 165: 7.5 Solução de Navier 146 Ac45 =
- Page 166 and 167: 7.5 Solução de Navier 148 ∞ ∞
- Page 168 and 169: 7.5 Solução de Navier 150 B11α
- Page 170 and 171: 7.5 Solução de Navier 152 s45 = s
- Page 172 and 173: 8 Aplicações 8.1 Bimorfo piezelé
- Page 174 and 175: 8.1 Bimorfo piezelétrico com atua
- Page 176 and 177: 8.2 Placa com pastilhas piezelétri
- Page 178 and 179: 8.2 Placa com pastilhas piezelétri
- Page 180 and 181: 8.2 Placa com pastilhas piezelétri
- Page 182 and 183: 8.2 Placa com pastilhas piezelétri
- Page 184 and 185: 8.2 Placa com pastilhas piezelétri
- Page 186 and 187: 8.3 Placa laminada quadrada simples
- Page 188 and 189: 8.3 Placa laminada quadrada simples
- Page 190 and 191: 8.3 Placa laminada quadrada simples
- Page 192 and 193: 9 Considerações finais A presente
- Page 194 and 195: 9.1 Sugestões para trabalhos futur
- Page 196 and 197: Referências bibliográficas ABREU,
- Page 198 and 199: Referências bibliográficas 180 CR
- Page 200 and 201: Referências bibliográficas 182 LE
- Page 204 and 205: APÊNDICE A -- Solução do sistema
- Page 206: Apêndice A -- Solução do sistema
Referências bibliográficas 184<br />
REDDY, J. N. A simple higher-or<strong>de</strong>r theory for laminated composite plates. Journal of<br />
Applied Mechanics, v. 51, p. 745 - 752, 1984.<br />
REDDY, J. N. Mechanics of laminated composite plates. 2. ed. Boca Raton: CRC Press,<br />
1997.<br />
REDDY, J. N. On laminated composite plates with integrated sensors and actuators.<br />
Engineering Structures, v. 21, p. 568 - 593, 1999.<br />
REDDY, J. N. Mechanics of laminated composite plates and shells: theory and analysis.<br />
Boca Raton: CRC Press, 2004.<br />
ODEN, J. T.; REDDY, J. N. An introduction to the mathematical theory of Finite Ele-<br />
ments. New York, John Wiley and Sons, 1976.<br />
REISSNER, E. On transverse bending of plates, including the effects of transverse shear<br />
<strong>de</strong>formation. International Journal of Solids and Structures, v. 11, p. 569 - 573, 1975.<br />
ROCHA, T. L. Mo<strong>de</strong>lagem <strong>de</strong> estruturas <strong>inteligentes</strong>. Dissertação (Mestrado) - Universi-<br />
da<strong>de</strong> Estadual Paulista, Ilha Solteira, 2004.<br />
SARAVANOS, D. A. Mixed laminate theory and finite element for smart piezoelectric<br />
composite shell structures. American Institute of Aeronautics and Astronautics Journal,<br />
v. 35, p. 1327 - 1333, 1997.<br />
SARAVANOS, D. A.; HEYLIGER, P. R.; HOPKINS, D. A. Layerwise mechanics and<br />
finite element for the dynamic analysis of piezoelectric composite plates. International<br />
Journal for Solids and Structures, v. 34, n. 3, p. 359 - 378, 1997.<br />
SHIMPI, R. C. Zeroth-or<strong>de</strong>r shear <strong>de</strong>formation theory for plates. American Institute of<br />
Aeronautics and Astronautics Journal, v. 37, p. 524 - 526, 1998.<br />
SORIANO, H. L. Método <strong>de</strong> Elementos Finitos em <strong>análise</strong> <strong>de</strong> estruturas. São Paulo:<br />
Edusp, 2003.
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