References
- Bickley W. G. (1941). Formulae for numerical differentiation. The Mathematical Gazette, 25, 19–27. doi: 10.2307/3606475
- Bose S. K., & Dey S. (2007). Curvilinear flow profiles based on Reynolds averaging. Journal of Hydraulic Engineering, 133(9), 1074–1079. doi: 10.1061/(ASCE)0733-9429(2007)133:9(1074)
- Bose S. K., & Dey S. (2009). Reynolds averaged theory of turbulent shear flows over undulating beds and formation of sand waves. Physical Review E, 80, 036304/1-9. doi: 10.1103/PhysRevE.80.036304
- Boussinesq J. V. (1877). Essai sur la théorie des eaux courantes. Mémoires présentés par divers savants à l'Académie des Sciences, Paris, 23, 1–680. Retrieved from http://gallica.bnf.fr/ark:/12148/bpt6k56673076
- Castro-Orgaz O., & Hager W. H. (2009). Curved-streamline transitional flow from mild to steep slopes. Journal of Hydraulic Research, 47(5), 574–584. doi: 10.3826/jhr.2009.3656
- Chow V. T. (1959). Open-channel hydraulics. New York: McGraw-Hill.
- Fenton J. D. (1996). Channel flow over curved boundaries and a new hydraulic theory. Proceedings of the 10th Congress, Asia-Pacific Division IAHR, Langkawi, Malaysia (pp. 266--273).
- Fenton J. D. (2005). On the energy and momentum principles in hydraulics. Proceedings of the 31st Congress IAHR, Seoul (pp. 625--636).
- Fenton J. D. (2014). The long wave equations for arbitrary slopes (Tech. Rep.). Alternative Hydraulics Paper 5. Retrieved from http://johndfenton.com/Papers/05-The-long-wave-equations-for-arbitrary-slopes.pdf
- Fenton J. D. (2015). Basic physical processes in rivers. In P. M. Rowiński & A. Radecki-Pawlik (Eds.), Rivers – physical, fluvial and environmental processes (chap. 1). Cham: Springer.
- Fenton J. D., & Zerihun Y. T. (2007). A Boussinesq approximation for open channel flow. Proceedings of the 32nd Congress IAHR, Venice.
- Henderson F. M. (1966). Open channel flow. New York: Macmillan.
- Khan A. A., & Steffler P. M. (1995). Discussion of “Potential-flow solution to 2D transition from mild to steep slope” by J. S. Montes, 1995, Journal of Hydraulic Engineering 120(5), pp. 601–621. Journal of Hydraulic Engineering, 121(9), 680–681.
- Khan A. A., & Steffler P. M. (1996). Vertically averaged and moment equations model for flow over curved beds. Journal of Hydraulic Engineering, 122(1), 3–9. doi: 10.1061/(ASCE)0733-9429(1996)122:1(3)
- Matthew G. D. (1991). Higher order, one-dimensional equations of potential flow in open channels. Proceeding of the Institution of Civil Engineers, 91, 187–201. doi: 10.1680/iicep.1991.14974
- Sivakumaran N. S., Tingsanchali T., & Hosking R. J. (1983). Steady shallow flow over curved beds. Journal of Fluid Mechanics, 128, 469–487. doi: 10.1017/S0022112083000567
- White F. M. (2009). Fluid mechanics (7th ed). New York: McGraw-Hill.
- Yen B. C. (2002). Open channel flow resistance. Journal of Hydraulic Engineering, 128(1), 20–39. doi: 10.1061/(ASCE)0733-9429(2002)128:1(20)
- Zerihun Y. T. (2004). A one-dimensional Boussinesq-type momentum model for steady rapidly varied open channel flows (Doctoral dissertation). Department of Civil and Environmental Engineering, Melbourne University. Retrieved from https://minerva-access.unimelb.edu.au/handle/11343/39476
- Zerihun Y. T., & Fenton J. D. (2007). A Boussinesq-type model for flow over trapezoidal profile weirs. Journal of Hydraulic Research, 45(4), 519–528. doi: 10.1080/00221686.2007.9521787