Some Specific Features of Integral Equations with the Cauchy Kernel on a Closed Contour in Hydrodynamic Problems

Some Specific Features of Integral Equations with the Cauchy Kernel on a Closed Contour in Hydrodynamic Problems

Singular integral equations of the first and second kind with the Cauchy kernel on a limiting narrow closed contour are theoretically considered. The initial equations are found to become different on the limiting contour. This singularity of integral equations with the Cauchy kernel does not allow...

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Veröffentlicht in:Journal of applied mechanics and technical physics 2018-07, Vol.59 (4), p.631-637
1. Verfasser: Gorelov, D. N.
Format: Artikel
Sprache:eng
Schlagworte:
Applications of Mathematics
Boundary value problems
Classical and Continuum Physics
Classical Mechanics
Constraining
Contours
Estimating techniques
Flat plates
Fluid- and Aerodynamics
Integral equations
Mathematical analysis
Mathematical Modeling and Industrial Mathematics
Mechanical Engineering
Physics
Physics and Astronomy
Shape
Singular integral equations
Thin airfoils
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Beschreibung
Zusammenfassung:Singular integral equations of the first and second kind with the Cauchy kernel on a limiting narrow closed contour are theoretically considered. The initial equations are found to become different on the limiting contour. This singularity of integral equations with the Cauchy kernel does not allow boundary-value problems of the flow around thin airfoils to be solved correctly; therefore, a system consisting of integral equations of the first and second kind is proposed for solving such problems. The results of the present study are tested against an exact solution of the problem of the flow past a flat plate.
ISSN:0021-8944
1573-8620
DOI:10.1134/S0021894418040089