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To the theory of anisotropic plane elasticity
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Alexandre Soldatov
Published/Copyright:
April 16, 2010
Abstract
The Lame system of general anisotropic plane elasticity is considered. A representation of a general solution or the system through a so-called Douglis analytic functions is given. The cases of orthotropic and isotropic media are also considered.
Keywords: elliptic systems; anisotropic plane elasticity; Douglis analytic functions; explicit representations
Published Online: 2010-04-16
Published in Print: 2010-04
© by Oldenbourg Wissenschaftsverlag, München, Germany
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- 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
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Keywords for this article
elliptic systems;
anisotropic plane elasticity;
Douglis analytic functions;
explicit representations
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
