For the issues of laminar viscous flow over (inside) stiff (liquid) spheres and cylinders, scale-invariant forms of conservation equations are used to provide solutions of modified form of equation of motion. For both spherical and cylindrical geometries, analytical solutions of the modified equation of motion are offered in all three regions. The latter resolves the Stokes dilemma for flow across cylinder with new solutions for laminar viscous flow across rigid sphere and cylinder.
Author (S) Details
Dr. Siavash H. Sohrab
Robert McCormick School of Engineering and Applied Science, Department of Mechanical Engineering, Northwestern University, Evanston, Illinois 60208, USA.
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