* The area in the z-plane can accordingly be represented on a circle in the ζ-plane by a rational function of ζ. A method for the solution of the biharmonic equation in such a case has been developed by Muschelišvili, N., Z. angew. Math. 13 (1933), 264–82CrossRefGoogle Scholar, but with the particular rational function that occurs here a simpler alternative is available. It may also be noted that if the area is bounded by two intersecting circular arcs the Green's function has been found by Dixon, A. C., Proc. London Math. Soc. (2), 19 (1920), 373–86Google Scholar; we consider here a particular case of such an area, but it was not found convenient to use the Green's function, which is not in finite terms.

* Proc. Cambridge Phil. Soc. 32 (1936), 598–613.Google Scholar

† Aeronautical Research Committee, F.M. 101 (1933), 506.

* The negative direction is taken because − ∂ψ/∂y, ∂ψ/∂x are the x, y components of velocity if (20) is taken as the equation for the stream function.