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On representations of Stokes flows and of the solutions of Navier's equation for linear elasticity
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Sándor Zsuppán
Published/Copyright:
September 25, 2009
In this paper we investigate different representation formulae for Stokes flows. We prove their equivalence for three dimensional star-shaped domains, and give a possible generalization for arbitrary spatial domains. We develop similar representations also for the solution of Navier's equation for linear elasticity for spatial and plane domains as well.
Received: 2007-February-25
Published Online: 2009-09-25
Published in Print: 2008-02
© Oldenbourg Wissenschaftsverlag
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Articles in the same Issue
- The Dirichlet problem for graphs of prescribed anisotropic mean curvature in ℝn+1
- On the value distribution of two differential monomials
- The completely indeterminate Caratheodory matrix problem in the Rq[a, b] class
- Sum of the periodic zeta-function over the nontrivial zeros of the Riemann zeta-function
- On representations of Stokes flows and of the solutions of Navier's equation for linear elasticity
- Asymptotic analysis of generalized Hermite polynomials
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- The zeros of certain differential polynomials
