Hilbert formulas for $r$-analytic functions and the Stokes flow about a biconvex lens
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Publication:3446426
DOI10.1090/S0033-569X-06-01011-7zbMath1119.30027MaRDI QIDQ3446426
Michael Zabarankin, Unnamed Author
Publication date: 14 June 2007
Published in: Quarterly of Applied Mathematics (Search for Journal in Brave)
Integration, integrals of Cauchy type, integral representations of analytic functions in the complex plane (30E20) Stokes and related (Oseen, etc.) flows (76D07) Navier-Stokes equations (35Q30) Riemann-Hilbert problems in context of PDEs (35Q15) Generalizations of Bers and Vekua type (pseudoanalytic, (p)-analytic, etc.) (30G20)
Related Items (3)
Asymmetric three-dimensional Stokes flows about two fused equal spheres ⋮ Analytical Solution for Spheroidal Drop under Axisymmetric Linearized Boundary Conditions ⋮ Dielectric Spherical Particle on an Interface in an Applied Electric Field
Cites Work
- Representation in terms of p-analytic functions of the general solution of equations of the theory of elasticity of a transversely isotropic body
- EXTREMUM PRINCIPLES FOR SLOW VISCOUS FLOW AND THE APPROXIMATE CALCULATION OF DRAG
- The Stokes flow problem for a class of axially symmetric bodies
- The Stokes flow about a spindle
- On Stokes flow about a torus
- Hydromechanics of low-Reynolds-number flow. Part 5. Motion of a slender torus
- Asymmetric creeping motion of an open torus
- Axisymmetric flow of a viscous fluid near the vertex of a body
- A note on the axisymmetric Stokes flow of viscous fluid past a spherical cap
- Hilbert Formulas for r-Analytic Functions in the Domain Exterior to Spindle
- On axially symmetric flow and the method of generalized electrostatics
- On a class of differential equations in mechanics of continua
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