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A two-surface problem for a biharmonic equation
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M. A. Atakhodzhaev
Published/Copyright:
September 7, 2013
Abstract
- In this paper we consider a two-surface problem for a biharmonic equation and formulate a sufficient condition for unique solvability of this problem and the conjugate problem in the class C2(D̅1) ∩ C4(D̅1).
Published Online: 2013-09-07
Published in Print: 2000-10
© 2013 by Walter de Gruyter GmbH & Co.
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Articles in the same Issue
- Contents
- Unique determination of surface breaking cracks in three-dimensional bodies
- A two-surface problem for a biharmonic equation
- Boundary shape identification in two-dimensional electrostatic problems using SQUIDs
- An identification problem related to a parabolic integrodifferential equation with non commuting spatial operators
- Numerical solution of the Cauchy problem in plane elastostatics
- Uniqueness theorems for a mammography inverse problem for the diffusion equation in the frequency domain
- Remarks on modification of Helgason’s support theorem
