Limit Behaviour of Solutions to a Class of Equivalued Surface Boundary Value Problems for Parabolic Equations
Abstract
In this paper, we discuss the limit behaviour of solutions for a class of equivalued surface boundary value problems for parabolic equations. When the equivalued surface boundary \overline{\Gamma}^\varepsilon_1 shrinks to a fixed point on boundary \Gamma_1, only homogeneous Neumann boundary conditions or Neumann boundary conditions with Dirac function appear on \Gamma_1.About this article
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Limit Behaviour of Solutions to a Class of Equivalued Surface Boundary Value Problems for Parabolic Equations. (2000). Journal of Partial Differential Equations, 13(2), 111-122. https://gsp.tricubic.dev/jpde/article/view/3936