A PDAE formulation of parabolic problems with dynamic boundary conditions

The weak formulation of parabolic problems with dynamic boundary conditions is rewritten in form of a partial differential-algebraic equation. More precisely, we consider two dynamic equations with a coupling condition on the boundary. This constraint is included explicitly as an additional equation and incorporated with the help of a Lagrange multiplier. Well-posedness of the formulation is shown.

[1]  E. Zeidler Nonlinear Functional Analysis and Its Applications: II/ A: Linear Monotone Operators , 1989 .

[2]  P. Bassanini,et al.  Elliptic Partial Differential Equations of Second Order , 1997 .

[3]  Christoph Zimmer,et al.  Runge-Kutta methods for linear semi-explicit operator differential-algebraic equations , 2017, Math. Comput..

[4]  J. Lions,et al.  Inequalities in mechanics and physics , 1976 .

[5]  Olaf Steinbach,et al.  Numerical Approximation Methods for Elliptic Boundary Value Problems: Finite and Boundary Elements , 2007 .

[6]  R. Altmann Regularization and simulation of constrained partial differential equations , 2015 .

[7]  G. M.,et al.  Partial Differential Equations I , 2023, Applied Mathematical Sciences.

[8]  G. Fragnelli,et al.  Analyticity of semigroups generated by operators with generalized Wentzell boundary conditions , 2005, Advances in Differential Equations.

[9]  C. Lubich,et al.  Numerical analysis of parabolic problems with dynamic boundary conditions , 2015, 1501.01882.

[10]  E. Zuazua,et al.  A direct method for boundary stabilization of the wave equation , 1990 .

[11]  Etienne Emmrich,et al.  Operator Differential-Algebraic Equations Arising in Fluid Dynamics , 2013, Comput. Methods Appl. Math..

[12]  David Hipp A unified error analysis for spatial discretizations of wave-type equations with applications to dynamic boundary conditions , 2017 .

[13]  Bernd Simeon,et al.  Computational Flexible Multibody Dynamics: A Differential-Algebraic Approach , 2013 .

[14]  Gisèle Ruiz Goldstein,et al.  Derivation and physical interpretation of general boundary conditions , 2006, Advances in Differential Equations.