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Sibirskii Zhurnal Industrial'noi Matematiki, 2012, Volume 15, Number 1, Pages 110–122
(Mi sjim715)
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On a precision estimate for a hydrodynamics problem with discontinuous coefficients in the norm of the space $\mathbf L_2(\Omega_h)$
A. V. Rukavishnikov Khabarovsk Branch, Institute of Applied Mathematics FEB RAS, Khabarovsk, RUSSIA
Abstract:
We study the 2-dimensional problem obtained by time-discretizing and linearizing the problem of flow of a 2-phase viscous fluid without mixing in the statement of incompressible Navier–Stokes equations with time-dependent interface. For an approximate solution to this problem we construct a scheme of a nonconformal finite element method. We estimate the rate of convergence of the mesh solution to the exact solution to the problem in the norm of $\mathbf L_2(\Omega_h)$, which agrees with simulations.
Keywords:
discontinuous coefficients, domain decomposition, nonconformal finite element method, mortar elements.
Received: 28.06.2010 Revised: 04.04.2011
Citation:
A. V. Rukavishnikov, “On a precision estimate for a hydrodynamics problem with discontinuous coefficients in the norm of the space $\mathbf L_2(\Omega_h)$”, Sib. Zh. Ind. Mat., 15:1 (2012), 110–122
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https://www.mathnet.ru/eng/sjim715 https://www.mathnet.ru/eng/sjim/v15/i1/p110
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Abstract page: | 266 | Full-text PDF : | 79 | References: | 40 | First page: | 5 |
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