On coupled Klein-Gordon-Schrödinger equations with acoustic boundary conditions.
Ha, Tae Gab, Park, Jong Yeoul (2010)
Boundary Value Problems [electronic only]
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Ha, Tae Gab, Park, Jong Yeoul (2010)
Boundary Value Problems [electronic only]
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Límaco, J., Clark, H.R., Medeiros, L.A. (2003)
International Journal of Mathematics and Mathematical Sciences
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Petr Kaplický, Jakub Tichý (2013)
Open Mathematics
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We investigate boundary regularity of solutions of generalized Stokes equations. The problem is complemented with perfect slip boundary conditions and we assume that the nonlinear elliptic operator satisfies non-standard ϕ-growth conditions. We show the existence of second derivatives of velocity and their optimal regularity.
L. Tarba, Jana Stará (1991)
Commentationes Mathematicae Universitatis Carolinae
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The asymptotic behaviour is studied for minima of regular variational problems with Neumann boundary conditions on noncompact part of boundary.
Bonanno, Gabriele, D'Aguì, Giuseppina (2010)
Abstract and Applied Analysis
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Fang, Ming, Gilbert, Robert P. (2009)
Boundary Value Problems [electronic only]
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Wiener, Joseph, Aftabizadeh, A.R. (1985)
International Journal of Mathematics and Mathematical Sciences
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Fatemi, M.R., Aliyev, N.A. (2010)
Abstract and Applied Analysis
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Jiaqing Pan (2011)
Open Mathematics
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In this paper the finite speed of propagation of solutions and the continuous dependence on the nonlinearity of a degenerate parabolic partial differential equation are discussed. Our objective is to derive an explicit expression for the speed of propagation and the large time behavior of the solution and to show that the solution continuously depends on the nonlinearity of the equation.