https://orcid.org/0000-0003-2591-2455
References
- Aboelmaged, M., Ahmed, N., Abdelmooty, M., & Attia, W. (2020). Effect of structure lateral system and irregularity on the fundamental time period of steel structure. Journal of Engineering and Applied Science, 67(6), 1363–26.
- Adeli, H. (1985). Approximate formulae for period of vibrations of building systems. Civil Engineering for Practicing and Design Engineers, 4(1), 93–128.
- Amini, A., Majd, M., & Hosseini, M. (2012). A study on the effect of bracing arrangement in the seismic behavior buildings with various concentric bracings by nonlinear static and dynamic analyses. In Fifthteenth World Conference on Earthquake engineering, Lisbon, Portugal.
- ASCE/SEI 7-16. (2016) . Minimum design loads for buildings and other structures. American Society of Civil Engineers. Reston.
- Brown, A. M. (2001). A step-by-step guide to nonlinear regression analysis of experimental data using a Microsoft Excel spreadsheet. Computer Methods and Programs in Biomedicine, 65(3), 191–200. https://doi.org/10.1016/S0169-2607(00)00124-3
- Chopra, A. K., & Goel, R. K. (2000). Building period formulas for estimating seismic displacements. Earthquake Spectra, 16(2), 533–536. https://doi.org/10.1193/1.1586125
- Chrysanthakopoulos, C., Bazeos, N., & Beskos, D. E. (2006). Approximate formulae for natural periods of plane steel frames. Journal of Constructional Steel Research, 62(6), 592–604. https://doi.org/10.1016/j.jcsr.2005.09.005
- Cinitha, A. (2012). A rational approach for fundamental period of low and medium rise steel building frames.
- Code, A. K. B. (2016). KBC 2016. Architectural Institute of Korea.
- Crowley, H., & Pinho, R. (2010). Revisiting Eurocode 8 formulae for periods of vibration and their employment in linear seismic analysis. Earthquake Engineering & Structural Dynamics, 39(2), 223–235. https://doi.org/10.1002/eqe.949
- ECP 201. (2012). The Egyptian code for loads and forces in construction and buildings. Housing and Building National Research Center.
- ECP 201. (2018). Egyptian code of practice for steel construction and bridges allowable stress design. Housing and Building National Research Centre.
- Elghazouli, A. Y. (2010). Assessment of European seismic design procedures for steel framed structures. Bulletin of Earthquake Engineering, 8(1), 65–89. https://doi.org/10.1007/s10518-009-9125-6
- Eurocode 8. (2004) . Design of structures for earthquake resistance. European Committee for Standardization.
- Ferraioli, M., Lavino, A., & Mandara, A. (2014). Behavior factor of code-designed steel moment-resisting frames. International Journal of Steel Structures, 14(2), 243–254. https://doi.org/10.1007/s13296-014-2005-1
- Gioncu, V., & Mazzolani, F. (2013). Seismic design of steel structures. CRC Press.
- Goel, R. K., & Chopra, A. K. (1997). Period formulas for moment-resisting frame buildings. Journal of Structural Engineering, 123(11), 1454–1461. https://doi.org/10.1061/(ASCE)0733-9445(1997)123:11(1454)
- Gong, M., Sun, J., & Xie, L. (2011, April). Empirical formula of fundamental period for steel structure based on seismic response record. In 2011 international conference on electric technology and civil engineering (ICETCE) (pp. 283–286). IEEE.
- Günaydın, E.,2012, ”Natural periods of braced steel frames designed to EC8”, [Master’s thesis].
- Harris J L and Michel J L. (2019). Approximate Fundamental Period for Seismic Design of Steel Buildings Assigned to High Risk Categories. Practice Periodical on Structural Design and Construction, 24(4). https://doi.org/10.1061/(ASCE)SC.1943-5576.0000444
- Hemmati, A., & Kheyroddin, A. (2013). Behavior of large-scale bracing system in tall buildings subjected to earthquake loads. Journal of Civil Engineering and Management, 19(2), 206–216. https://doi.org/10.3846/13923730.2012.741613
- Hsiao, J. K. (2009). Computation of fundamental periods for moment frames using a hand-calculated approach. Electronic Journal of Structural Engineering, 9, 16–28. https://doi.org/10.56748/ejse.9114
- Kwon, O. S., & Kim, E. S. (2010). Evaluation of building period formulas for seismic design. Earthquake Engineering & Structural Dynamics, 39(14), 1569–1583.
- Landolfo, R. (2018, June). Seismic design of steel structures: New trends of research and updates of Eurocode 8. In European Conference on Earthquake Engineering Thessaloniki, Greece (pp. 413–438). Springer, Cham.
- Mazzolani, F. M., & Piluso, V. (1996). Theory and Design of Seismic Resistant Steel Frames. E & FN SPON, an imprint of Chapman & Hall.
- Mirtaheri, M., & Salehi, F. (2018). Ambient vibration testing of existing buildings: Experimental, numerical and code provisions. Advances in Mechanical Engineering, 10(4), 1687814018772718. https://doi.org/10.1177/1687814018772718
- Nassani, D. E. (2014). A simple model for calculating the fundamental period of vibration in steel structures. APCBEE Procedia, 9, 339–346. https://doi.org/10.1016/j.apcbee.2014.01.060
- Pandit, L., & Shinde, R. R. (2015). Study of effect of bracing on critical storey of high rise frame structure. International Journal of Engineering Research and General Science, 31, 289–294. http://ijergs.org/
- Ruggieri, S., Fiore, A., & Uva, G. (2021). A new approach to predict the fundamental period of vibration for newly-designed reinforced concrete buildings. Journal of Earthquake Engineering, 1–26. https://doi.org/10.1080/13632469.2021.1961929
- Smith, B. S., & Crowe, E. (1986). Estimating periods of vibration of tall buildings. Journal of Structural Engineering, 112(5), 1005–1019. https://doi.org/10.1061/(ASCE)0733-9445(1986)112:5(1005)
- Standards Association of Australia. (2007). Minimum design loads on structures: Part 4: Earthquake Loads - AS1170.4 and Commentary.
- Tremblay, R. (2005). Fundamental periods of vibration of braced steel frames for seismic design. Earthquake Spectra, 21(3), 833–860. https://doi.org/10.1193/1.1989358
- Tremblay, R., & Robert, N. (2001). Seismic performance of low-and medium-rise chevron braced steel frames. Canadian Journal of Civil Engineering, 28(4), 699–714. https://doi.org/10.1139/l01-038
- Uva, G., Porco, F., Fiore, A., & Ruggieri, S. (2018). Effects in conventional nonlinear static analysis: Evaluation of control node position. Structures, 13, 178–192. https://doi.org/10.1016/j.istruc.2017.12.006
- Van der Westhuizen, A. M., Markou, G., & Bakas, N. (2022). Development of a new fundamental period formula for steel structures considering the soil-structure interaction with the use of machine learning algorithms.
- Young, K. (2011). “An investigation of the fundamental period of vibration of irregular steel structures.” [MS.c. diss.]. The Ohio State University.
- Young, K., & Adeli, H. (2014). Fundamental period of irregular concentrically braced steel frame structures. The Structural Design of Tall and Special Buildings, 23(16), 1211–1224. https://doi.org/10.1002/tal.1136
- Young, K., & Adeli, H. (2016). Fundamental period of irregular eccentrically braced tall steel frame structures. Journal of Constructional Steel Research, 120, 199–205. https://doi.org/10.1016/j.jcsr.2016.01.001
- Yousef, A. M., El-Metwally, S. E., & El-Mandouh, M. A. (2010). Seismic response of vertically irregular HSC moment-resisting building frames. Journal of Engineering and Applied Science, 57(5), 409–430.
- Zalka, K. A. (2001). A simplified method for calculation of the natural frequencies of wall–frame buildings. Engineering Structures, 23(12), 1544–1555. https://doi.org/10.1016/S0141-0296(01)00053-0