References
- Abramowitz, M., & Stegun, I. N. (1972). Handbook of mathematical functions (10th ed.). New York: Dover.
- Chadwick, E. A. (2013). The far-field Green’s integral in stokes flow from the boundary integral formulation. Computer Modeling in Engineering Sciences, 96(3), 177–184.
- Chadwick, E. A. (2015). Modelling steady flow past a two-dimensional bluff body by using eulerlets. In V. Mantič, A. Sáez and M. H. Aliabadiá (Eds.), Advances in boundary element and meshless techniques (Vol. XVI, pp. 239–247). Eastleigh, UK: EC Ltd.
- Chadwick, E. A., & Kapoulas, A. (2015). Using eulerlets to give a boundary integral formulation in Euler flow and discussion on applications. Computer Modeling in Engineering Sciences, 102, 331–343.
- Coutanceau, M., & Bouard, R. (1949). Experimental determination of the main features of the viscous flow in the wake of a circular cylinder in uniform translation. Journal of Fluid Mechanics, 79, 231–256.
- Goldstein, S. (1960). Lectures on fluid mechanics. New York, NY: Interscience.
- Kiya, M., & Arie, M. (1977). An inviscid bluff-body wake model which includes the far-wake displacement effect. Journal of Fluid Mechanics, 81(3), 593–607.
- Kovasznay, L. S. G. (1949). Hot-wire investigation of the wake behind cylinders at low Reynolds numbers. Proceedings of the Royal Society A, 198, 174–190.
- Tordella, D., & Belan, M. (2003). A new matched asymptotic expansion for the intermediate and far flow behind a finite body. Physics of Fluids, 15(7), 1897–1906.
- Van Dyke, M. (1982). An album of fluid motion. Stanford: Parabolic Press.