Year 2020,
, 1 - 6, 20.03.2020
Ahmad Reshad Noorı
,
Timuçin Alp Aslan
Beytullah Temel
References
- Chakraborty A, Gopalakrishnan S, Reddy J, (2003). A new beam finite element for the analysis of functionally graded materials. International Journal of Mechanical Sciences. 45(3):519-39.
- Zhong Z, Yu T, (2007). Analytical solution of a cantilever functionally graded beam. Composites Science and Technology. 67(3-4):481-8.
- Kadoli R, Akhtar K, Ganesan N, (2008). Static analysis of functionally graded beams using higher order shear deformation theory. Applied Mathematical Modelling. 32(12):2509-25.
- Li X-F, (2008). A unified approach for analyzing static and dynamic behaviors of functionally graded Timoshenko and Euler–Bernoulli beams. Journal of Sound and Vibration. 318(4-5):1210-29.
- Şimşek M, (2009). Static analysis of a functionally graded beam under a uniformly distributed load by Ritz method. International Journal of Engineering & Applied Sciences. 1(3):1-11.
- Li X-F, Wang B-L, Han J-C, (2010). A higher-order theory for static and dynamic analyses of functionally graded beams. Archive of Applied Mechanics. 80(10):1197-212.
- Nguyen T-K, Vo TP, Thai H-T, (2013). Static and free vibration of axially loaded functionally graded beams based on the first-order shear deformation theory. Composites Part B: Engineering. 55:147-57.
- Thai H-T, Vo TP, (2012). Bending and free vibration of functionally graded beams using various higher-order shear deformation beam theories. International Journal of Mechanical Sciences.62(1):57-66.
- Hadji L, Khelifa Z, Daouadji T, Bedia E, (2015). Static bending and free vibration of FGM beam using an exponential shear deformation theory. Coupled Systems Mechanics. 4(1):99-114.
- Li S-R, Cao D-F, Wan Z-Q, (2013). Bending solutions of FGM Timoshenko beams from those of the homogenous Euler–Bernoulli beams. Applied Mathematical Modelling. 37(10-11):7077-85.
- Jing L-l, Ming P-j, Zhang W-p, Fu L-r, Cao Y-p, (2016). Static and free vibration analysis of functionally graded beams by combination Timoshenko theory and finite volume method. Composite structures. 138:192-213.
- Khan AA, Naushad Alam M, Wajid M, (2016). Finite element modelling for static and free vibration response of functionally graded beam. Latin American Journal of Solids and Structures. 13(4):690-714.
- Ziou H, Guenfoud H, Guenfoud M, (2016). Numerical modelling of a Timoshenko FGM beam using the finite element method. International Journal of Structural engineering. 7(3):239-61.
- Temel B, Aslan TA, Noori AR, (2017).An Efficient Dynamic Analysis of Planar Arches, European Mechanical Science. 1(3):82-88.
- Temel B, Yildirim S, Tutuncu N, (2014). Elastic and viscoelastic response of heterogeneous annular structures under Arbitrary Transient Pressure. International Journal of Mechanical Sciences. 89:78-83.
- Yildirim S, Tutuncu N, (2018). Axisymmetric plane vibration analysis of polar-anisotropic disks. Composite Structures. 194:509-515.
- Yildirim S, Tutuncu N, (2018). Radial vibration analysis of heterogeneous and non-uniform disks via complementary functions method. The Journal of Strain Analysis for Engineering Design. 53(5):332-337.
- Eker M, Yarımpabuç D, Çelebi K, (2018). The Effect of the Poisson Ratio on Stresses of Heterogeneous Pressure Vessels. European Mechanical Science. 2(2): 52-59.
- Yarımpabuç D, Temo A, (2018). The Effect of Uniform Magnetic Field on Pressurized FG Cylindirical and Spherical Vessels. European Mechanical Science. 3(4): 133-141.
- Noori AR, Temel B. On the vibration analysis of laminated composite parabolic arches with variable cross-section of various ply stacking sequences. Mechanics of Advanced Materials and Structures 2018; DOI: 10.1080/15376494.2018.1524949.
- Vo TP, Thai H., Nguyen TK, Inam F, (2014). Static and vibration analysis of functionally graded beams using refined shear deformation theory. Meccanica. 49: 155.
Static Analysis of FG Beams via Complementary Functions Method
Year 2020,
, 1 - 6, 20.03.2020
Ahmad Reshad Noorı
,
Timuçin Alp Aslan
Beytullah Temel
Abstract
Static analysis of Functionally Graded (FG) beams is
studied by the Complementary Functions Method (CFM). The material properties,
Young’s modulus, of the straight beams, are graded in the thickness direction
based on a power law distribution while the Poisson’s ratio is supposed to be
constant. Governing equations of the considered problem are obtained with the
aid of minimum total potential energy principle based on Timoshenko’s beam
theory (FSDT). The main purpose of this paper is the infusion of the CFM to the
static analysis of FG straight beams. The effectiveness and accuracy of the
proposed method are confirmed by comparing its numerical results with those
available in the literature. Application of this efficient method provides
accurate results of static response for FGM beams with different variations of
material properties in the thickness of the beam.
References
- Chakraborty A, Gopalakrishnan S, Reddy J, (2003). A new beam finite element for the analysis of functionally graded materials. International Journal of Mechanical Sciences. 45(3):519-39.
- Zhong Z, Yu T, (2007). Analytical solution of a cantilever functionally graded beam. Composites Science and Technology. 67(3-4):481-8.
- Kadoli R, Akhtar K, Ganesan N, (2008). Static analysis of functionally graded beams using higher order shear deformation theory. Applied Mathematical Modelling. 32(12):2509-25.
- Li X-F, (2008). A unified approach for analyzing static and dynamic behaviors of functionally graded Timoshenko and Euler–Bernoulli beams. Journal of Sound and Vibration. 318(4-5):1210-29.
- Şimşek M, (2009). Static analysis of a functionally graded beam under a uniformly distributed load by Ritz method. International Journal of Engineering & Applied Sciences. 1(3):1-11.
- Li X-F, Wang B-L, Han J-C, (2010). A higher-order theory for static and dynamic analyses of functionally graded beams. Archive of Applied Mechanics. 80(10):1197-212.
- Nguyen T-K, Vo TP, Thai H-T, (2013). Static and free vibration of axially loaded functionally graded beams based on the first-order shear deformation theory. Composites Part B: Engineering. 55:147-57.
- Thai H-T, Vo TP, (2012). Bending and free vibration of functionally graded beams using various higher-order shear deformation beam theories. International Journal of Mechanical Sciences.62(1):57-66.
- Hadji L, Khelifa Z, Daouadji T, Bedia E, (2015). Static bending and free vibration of FGM beam using an exponential shear deformation theory. Coupled Systems Mechanics. 4(1):99-114.
- Li S-R, Cao D-F, Wan Z-Q, (2013). Bending solutions of FGM Timoshenko beams from those of the homogenous Euler–Bernoulli beams. Applied Mathematical Modelling. 37(10-11):7077-85.
- Jing L-l, Ming P-j, Zhang W-p, Fu L-r, Cao Y-p, (2016). Static and free vibration analysis of functionally graded beams by combination Timoshenko theory and finite volume method. Composite structures. 138:192-213.
- Khan AA, Naushad Alam M, Wajid M, (2016). Finite element modelling for static and free vibration response of functionally graded beam. Latin American Journal of Solids and Structures. 13(4):690-714.
- Ziou H, Guenfoud H, Guenfoud M, (2016). Numerical modelling of a Timoshenko FGM beam using the finite element method. International Journal of Structural engineering. 7(3):239-61.
- Temel B, Aslan TA, Noori AR, (2017).An Efficient Dynamic Analysis of Planar Arches, European Mechanical Science. 1(3):82-88.
- Temel B, Yildirim S, Tutuncu N, (2014). Elastic and viscoelastic response of heterogeneous annular structures under Arbitrary Transient Pressure. International Journal of Mechanical Sciences. 89:78-83.
- Yildirim S, Tutuncu N, (2018). Axisymmetric plane vibration analysis of polar-anisotropic disks. Composite Structures. 194:509-515.
- Yildirim S, Tutuncu N, (2018). Radial vibration analysis of heterogeneous and non-uniform disks via complementary functions method. The Journal of Strain Analysis for Engineering Design. 53(5):332-337.
- Eker M, Yarımpabuç D, Çelebi K, (2018). The Effect of the Poisson Ratio on Stresses of Heterogeneous Pressure Vessels. European Mechanical Science. 2(2): 52-59.
- Yarımpabuç D, Temo A, (2018). The Effect of Uniform Magnetic Field on Pressurized FG Cylindirical and Spherical Vessels. European Mechanical Science. 3(4): 133-141.
- Noori AR, Temel B. On the vibration analysis of laminated composite parabolic arches with variable cross-section of various ply stacking sequences. Mechanics of Advanced Materials and Structures 2018; DOI: 10.1080/15376494.2018.1524949.
- Vo TP, Thai H., Nguyen TK, Inam F, (2014). Static and vibration analysis of functionally graded beams using refined shear deformation theory. Meccanica. 49: 155.