@article {Iosilevskii:May 1998:0033-5614:241,
	author = "Iosilevskii, G",
	title = "An asympototic theory of high-aspect-ratio non-planar curved wings in steady incompressible flow",
	journal = "Quarterly Journal of Mechanics and Applied Mathematics",
	volume = "51",
	year = "May 1998",
	abstract = "An asymptotic aerodynamic theory of a high-aspect-ratio thin wing in a steady incompressible flow is developed for the general case where the wing is curved into a swept non-planar arc. The theory is based on a boundary integral equation for (velocity) potential jump <IMG SRC="/iso-ents/isogrk1/mgr-s.gif" ALT="mgr"> across the wing's surface, which is well known in the classical wing theory. Using the reciprocal <IMG SRC="/iso-ents/isogrk1/egr-s.gif" ALT="egr"> of the aspect ratio as a small parameter, this equation is solved asymptotically to obtain <IMG SRC="/iso-ents/isogrk1/mgr-s.gif" ALT="mgr"> as a series <IMG SRC="/iso-ents/isogrk1/mgr-s.gif" ALT="mgr">&#060;INF&#062;0&#060;/INF&#062; + (<IMG SRC="/iso-ents/isogrk1/egr-s.gif" ALT="egr"> ln <IMG SRC="/iso-ents/isogrk1/egr-s.gif" ALT="egr">)<IMG SRC="/iso-ents/isogrk1/mgr-s.gif" ALT="mgr">&#060;INF&#062;1&#060;/INF&#062; + <IMG SRC="/iso-ents/isogrk1/egr-s.gif" ALT="egr"><IMG SRC="/iso-ents/isogrk1/mgr-s.gif" ALT="mgr">&#060;INF&#062;2&#060;/INF&#062; +..., where the respective terms are given by quadratures. The first three terms in this series, as well as the first three terms in comparable series for the lift, side-force, drag and rolling moment coefficient, are found explicitly.",
	pages = "241-262(22)",
	url = "http://www.ingentaconnect.com/content/oup/qjmamj/1998/00000051/00000002/art00241"
}