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Mixed boundary value problems for higher-order complex partial differential equations
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Ümit Aksoy
Published/Copyright:
April 16, 2010
Abstract
In this paper, we introduce the operators related to mixed boundary value problems for general linear elliptic partial complex differential equations in the unit disc of the complex plane. The solvability of the relevant boundary value problems will be studied by transforming them into singular integral equations.
Keywords: Higher order complex partial differential equations; singular integral operators; Schwarz; Dirichlet; Neumann
Published Online: 2010-04-16
Published in Print: 2010-04
© by Oldenbourg Wissenschaftsverlag, München, Germany
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- The oblique derivative problem for second order nonlinear equations of mixed type with two degenerate lines
- On the length of level sets of real functions
- Green´s functions on the Heisenberg group
- Mixed boundary value problems for higher-order complex partial differential equations
- Part I: Theory of potential of convergence Part II: Applications in the field of ordinary differential equations
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Keywords for this article
Higher order complex partial differential equations;
singular integral operators;
Schwarz;
Dirichlet;
Neumann
Articles in the same Issue
- To the theory of anisotropic plane elasticity
- The oblique derivative problem for second order nonlinear equations of mixed type with two degenerate lines
- On the length of level sets of real functions
- Green´s functions on the Heisenberg group
- Mixed boundary value problems for higher-order complex partial differential equations
- Part I: Theory of potential of convergence Part II: Applications in the field of ordinary differential equations
- On zeros and boundary behavior of bounded harmonic functions
