https://orcid.org/0000-0002-7493-3386
References
- ANSYS, Swanson Analysis System Inc. 2013. 201 Johnson Road, Houston, PA15342 1300, USA.
- Aribas, U. N., M. Ermis, N. Eratli, and M. H. Omurtag. 2019. The static and dynamic analyses of warping included composite exact conical helix by mixed FEM. Composites Part B: Engineering 160:285–97. doi:10.1016/j.compositesb.2018.10.018.
- Aribaş, Ü. N., and M. H. Omurtag. 2019. The static response of sandwich exact conical helices via MFEM. Journal of Structural Engineering & Applied Mechanics 2 (4):153–63. doi:10.31462/jseam.2019.04153163.
- Busool, W., and M. Eisenberger. 2002. Free vibration of helicoidal beams of arbitrary shape and variable cross section. Journal of Vibration and Acoustics 124 (3):397–409. doi:10.1115/1.1468870.
- Calim, F. F. 2009a. Dynamic analysis of composite coil springs of arbitrary shape. Composites Part B: Engineering 40 (8):741–57. doi:10.1016/j.compositesb.2009.04.017.
- Calim, F. F. 2009b. Forced vibration of helical rods of arbitrary shape. Mechanics Research Communications 36 (8):882–91. doi:10.1016/j.mechrescom.2009.07.007.
- Calim, F. F. 2016a. Transient analysis of axially functionally graded Timoshenko beams with variable cross-section. Composites Part B: Engineering 98:472–83. doi:10.1016/j.compositesb.2016.05.040.
- Calim, F. F. 2016b. Dynamic response of curved Timoshenko beams resting on viscoelastic foundation. Structural Engineering and Mechanics 59 (4):761–74. doi:10.12989/sem.2016.59.4.761.
- Calim, F. F. 2020. Vibration analysis of functionally graded Timoshenko beams on Winkler-Pasternak elastic foundation. Iranian Journal of Science and Technology, Transactions of Civil Engineering 44 (3):901–20. doi:10.1007/s40996-019-00283-x.
- Eratli, N., M. Yilmaz, K. Darilmaz, and M. H. Omurtag. 2016. Dynamic analysis of helicoidal bars with non-circular cross-sections via mixed FEM. Structural Engineering and Mechanics 57 (2):221–38. doi:10.12989/sem.2016.57.2.221.
- Ermis, M., and M. H. Omurtag. 2017. Static and dynamic analysis of conical helices based on exact geometry via mixed FEM. International Journal of Mechanical Sciences 131–132:296–304. doi:10.1016/j.ijmecsci.2017.07.010.
- Girgin, K. 2006. Free vibration analysis of non-cylindrical helices with, variable cross-section by using mixed FEM. Journal of Sound and Vibration 297 (3–5):931–45. doi:10.1016/j.jsv.2006.05.001.
- İnan, M. 1964. Initial Value Problems in Elastomechanics and Transfer Matrix Method (in Turkish). Library of Istanbul Technical University.
- Kacar, I., and V. Yildirim. 2016. Free vibration/buckling analyses of non-cylindrical initially compressed helical composite springs. Mechanics Based Design of Structures and Machines 44 (4):340–53. doi:10.1080/15397734.2015.1066687.
- Kobelev, V. 2020. Delayed presetting of helical springs. Mechanics Based Design of Structures and Machines 48 (1):122–32. doi:10.1080/15397734.2019.1669457.
- Kumari, P., A. Singh, R. K. N. D. Rajapakse, and S. Kapuria. 2017. Three-dimensional static analysis of Levy-type functionally graded plate with in-plane stiffness variation. Composite Structures 168:780–91. doi:10.1016/j.compstruct.2017.02.078.
- Li, S., J. Hu, C. Zhai, and L. Xie. 2013. A unified method for modeling of axially and/or transversally functionally graded beams with variable cross-section profile. Mechanics Based Design of Structures and Machines 41 (2):168–88. doi:10.1080/15397734.2012.709466.
- Liu, W., and Z. Zhong. 2009. Three-dimensional analysis of simply supported functionally graded plate with arbitrary distributed elastic modulus. Tsinghua Science and Technology 14 (S2):58–63. doi:10.1016/S1007-0214(10)70032-8.
- Nagaya, K., S. Takeda, and Y. Nakata. 1986. Free vibration of coil springs of arbitrary shape. International Journal for Numerical Methods in Engineering 23 (6):1081–99. doi:10.1002/nme.1620230607.
- Singh, A., and P. Kumari. 2018. Two-dimensional elasticity solution for arbitrarily supported axially functionally graded beams. Journal of Solid Mechanics 10 (4):719–33.
- Singh, A., and P. Kumari. 2020. Three-dimensional free vibration analysis of composite FGM rectangular plates with in-plane heterogeneity: An EKM solution. International Journal of Mechanical Sciences 180:105711. doi:10.1016/j.ijmecsci.2020.105711.
- Sun, D. L., and X. F. Li. 2019. Initial value method for free vibration of axially loaded functionally graded Timoshenko beams with nonuniform cross-section. Mechanics Based Design of Structures and Machines 47 (1):102–20. doi:10.1080/15397734.2018.1526690.
- Vel, S. S., and R. C. Batra. 2002. Exact solution for thermoelastic deformations of functionally graded thick rectangular plates. AIAA Journal 40 (7):1421–33. doi:10.2514/2.1805.
- Vel, S. S., and R. C. Batra. 2004. Three-dimensional exact solution for the vibration of functionally graded rectangular plates. Journal of Sound and Vibration 272 (3–5):703–30. doi:10.1016/S0022-460X(03)00412-7.
- Wang, G., L. Zhu, K. Higuchi, W. Fan, and L. Li. 2019. Solution for free vibration of spatial curved beams. Engineering Computations 37 (5):1597–616. doi:10.1108/EC-03-2019-0097.
- Yildirim, V. 2002. Expressions for predicting fundamental natural frequencies of non-cylindrical helical springs. Journal of Sound and Vibration 252 (3):479–91. doi:10.1006/jsvi.2001.4005.
- Yildirim, V., and N. Ince. 1997. Natural frequencies of helical springs of arbitrary shape. Journal of Sound and Vibration 204 (2):311–29. doi:10.1006/jsvi.1997.0940.
- Yu, A. M., and Y. Hao. 2012. Improved Riccati transfer matrix method for free vibration of non-cylindrical helical springs including warping. Shock and Vibration 19 (6):1167–80. doi:10.1155/2012/713874.
- Yu, A. M., and Y. Hao. 2013a. Effect of warping on natural frequencies of symmetrical cross-ply laminated composite non-cylindrical helical springs. International Journal of Mechanical Sciences 74:65–72. doi:10.1016/j.ijmecsci.2013.04.010.
- Yu, A. M., and Y. Hao. 2013b. Warping effect in free vibration analysis of unidirectional composite non-cylindrical helical springs. Meccanica 48 (10):2453–65. doi:10.1007/s11012-013-9760-5.
- Zhong, Z., S. Chen, and E. Shang. 2010. Analytical solution of a functionally graded plate in cylindrical bending. Mechanics of Advanced Materials and Structures 17 (8):595–602. doi:10.1080/15376494.2010.517729.