Singular Integral Equations, Boundary Problems of Function Theory and Their Application to Mathematical Physics, by N.I. Muskhelishvili, 2nd Edition Moscow. User Review – Flag as inappropriate. Cauchy integral: MUS at [email protected] Contents. PART I. 6. Generalization to the case of several variables. N. I. Muskhelishvili. Singular integral equations. boundary problems in the theory of functions and their applications to mathematical physics. Fizmatgiz.
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Singular Integral Equations
Other editions – View all Singular Integral Equations: Radok Limited preview singular integral equations muskhelishvili Boundary problems of functions theory and their My library Help Advanced Book Search. Common terms and phrases applied arbitrary constants arbitrary polynomial assumed boundary condition boundary problems boundary value bounded at infinity bounded function Cauchy integral class H class h c1 coefficients considered const continuous function corresponding defined degree at infinity degree not greater denoted determined different from zero easily seen equivalent fact finite number Fredholm equation Fredholm integral equation Fredholm operator function p t fundamental solution given class given function H condition half-plane harmonic function hence homogeneous equation singular integral equations muskhelishvili Hilbert problem homogeneous problem I.
Vekua infinite region last section linear linearly independent solutions matrix inetgral necessary and sufficient non-special ends number of linearly obtained obviously particular solution plane polynomial of degree proved real constant real function reduced Singular integral equations muskhelishvili problem right side satisfies the H sectionally holomorphic function singular equations singular integral equations tangent theorem tion unknown function vanishing at infinity vector.
Boundary Problems of Function Theory and Their Muskhelishvili Limited preview – Selected pages Title Page.
They are highly effective in solving boundary problems occurring in the theory of functions of a complex singular integral equations muskhelishvili, potential theory, the theory of elasticity, and the theory of fluid mechanics. Intended for graduate students, applied and pure mathematicians, engineers, physicists, and researchers in a variety of scientific and industrial fields, this text is accessible to students acquainted with the basic theory of functions of a complex variable and the theory singular integral equations muskhelishvili Dingular integral equations.
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