Mini-Workshop: Control of Free Boundaries

Abstract

This meeting was attended by 17 participants from Austria, Germany, and Great Britain with expertise from the three areas of optimal control of PDEs, modeling involving free boundary problems and the mathematical and numerical analysis of free boundary problems. Apart from discussing current problems, issues and techniques from the the differing communities the focus of the workshop was set on defining model problems in free boundary control in order to develop the necessary analytical and numerical techniques required to successfully tackle new emerging classes of problems. The governing equations for the dynamics of the interfaces in many of these applications involve surface tension expressed in terms of the mean curvature and a driving force. Here the forcing terms depend on variables that are solutions of additional pdes which hold either on the interface itself or in the surrounding bulk regions. Examples in the case of solid-liquid interfaces in crystal growth include adjusting the interface to a prescribed shape or ensuring homogeneous doping at the interface. Whereas in the case of epitaxial growth the optimal design would be to ensure a given smoothness of the forming surface. Further examples of control of free boundaries are \begin{itemize} \item establishing temperature gradients at triple points in Czochralski growth, \item coating with uniform thickness. \end{itemize} \vspace{0.5cm} The presentations by Emmerich, Griesse, Pinnau, Stinner and Welford concerned modeling and applications for optimal control involving free boundaries. B\\"ansch, Dziuk and Elliott and Styles gave talks concerning the numerical and mathematical formulations of free boundary problems. Finally, Deckelnick, Garcke, Hinterm\\"uller, Hinze, Kunisch and Ziegenbalg focused on the mathematical and numerical analysis of optimal control problems involving free boundaries. Discussions during the workshop established the following paradigm optimal control problems involving free boundaries: \vspace{0.5cm} \begin{itemize} \item {\it Control of mean curvature flow} Here we are concerned with the interface evolution equation $$ V=-H+\theta $$ where $V$ is the normal velocity of a surface $\Gamma(t)$ whose mean curvature is $H$. Forced mean curvature flow is considered as a subproblem of curvature driven surfaces occurring in Stefan problems. Also omitting the curvature term leads to control of an eikonal equation. The field variable $\theta$ can be used to control the location of the surface. This evolution law as it is posed does not involve field equations off the interface. In certain circumstances the solution can be written as a graph in which case one is controlling a quasi-linear parabolic equation of geometric type. On the other hand it can also be formulated as a level set equation. During the workshop it became clear that each approach to describing the free surface leads to mathematical and numerical issues characteristic to the description of the free boundary. \vspace{0.5cm} \item {\it Control of the Hele--Shaw fluid injection problem} Denoting by $p$ the pressure in a fluid occupying a two dimensional domain $\Omega(t)$ we have $$ \Delta p=0 \quad \mbox{in} \quad \Omega(t) $$ $$ V=-p\_{\nu}, \quad p=0 \quad \mbox{on} \quad \Gamma(t) $$ where $V$ is the normal velocity of an advancing front $\Gamma(t)$ separating the wet and dry regions, $\nu$ is the normal to $\Gamma(t)$ and the fluid velocity is $-\nabla p$. The boundary of the fluid region has a fixed portion on which the flux may be prescribed so that $$ p\_{\nu}=Q \quad \mbox{on} \quad \Gamma\_I. $$ This prescribed flux may then be used to control the location of the free boundary and possibly the location of so called weld lines where two portions of fluid meet. Using the transformation, \cite{EllJan}, $$ u=\int^t\_0p $$ results in an obstacle problem for $u$ in which time $t$ becomes a parameter. There is also the following enthalpy formulation $$ e\_t=\Delta p, \quad e \in \mathcal H(p) $$ where $\mathcal H(\cdot)$ is the Heaviside function. Thus problem can be used to understand the issues surrounding the optimal control of obstacle problems and degenerate parabolic equations. See \cite{Ell-Ock} for an account of mathematical and numerical approaches to models involving free boundaries being defined by level sets of solutions of variational inequalities and nonlinear degenerate parabolic equations. During the workshop issues relating to solving obstacle problems by methods such as semi-smooth Newton methods were discussed. \vspace{0.5cm} \item {\it Control of convection--driven free surface Stokes flow} Control of convection--driven Stokes flow serves as model for control of a more realistic engineering oriented fluid flow problem with a free surface. Denoting by $\vu, p, T$ the the velocity, pressure, and temperature of the fluid in the domain $\Omega$ with a free top surface $\Gamma\_f$ and fixed boundary $\Gamma = \partial\Omega \setminus \Gamma\_f$ we have $$ \begin{aligned} - \eta , \Delta \vu + \nabla p & = \[1-\beta , (T-T\_{ref})] , \vg & & \text{in } \Omega \ \nabla \cdot \vu & = 0 & & \text{in } \Omega \ - \kappa , \Delta T + \varrho , (\vu \cdot \nabla) T & = 0 & & \text{in } \Omega. \end{aligned} $$ As temperature boundary condition we may take $$ \begin{aligned} \kappa \frac{\partial}{\partial n} T + \alpha , (T - T\_\infty) & = 0 & & \text{on } \Gamma \cup \Gamma\_f, \end{aligned} $$ where $T\_\infty$ denotes the environmental temperature. At $\Gamma$ we impose a no-slip condition $$ \begin{aligned} \vu & = 0 & & \text{on } \Gamma. \end{aligned} $$ With the total stress tensor $$ \TT = -pI + \eta , \big(\nabla{\vu} + (\nabla{\vu})^\top\big) $$ we have $$ \begin{aligned}{} \[\vn \cdot \TT \vn] & = \gamma H,\ \[\vt \cdot \TT \vn] & = 0, \end{aligned} $$ at the free surface, where $\[\cdot]$ denotes the jump of a quantity across the free surface, $H$ denotes the mean curvature of the free surface and $\vn$ and $\vt$ are surface normal and tangent vectors, respectively. In order to fix the solution, the free surface is required to be normal to the fixed boundary of the container and the volume of fluid is prescribed. Based on this system of equations one may formulate optimal control problems. The environment temperature $T\_\infty$ or additional volume sources in the Stokes or heat equation may serve as control variables. As objectives, one can think of standard tracking-type functionals, involving the fluid velocity and/or the temperature, accounting for flat free surfaces, say. A more general MHD model which contains the model above as a special case is presented in the contribution of Roland Griesse. \end{itemize} \vspace{0.5cm} Surveys and articles concerning the mathematical and numerical approaches to optimal control of free boundary problems may be found in the conference proceedings \cite{FasPrim, BossDamFrem, HoffSprek}. The level set approach to related problems of optimal design are surveyed in \cite{BurgerOsher}. The book \cite{Barbu} contains theoretical results for optimal control of variational inequalities. Also we mention a survey of numerical methods for interface evolution involving curvature, \cite{DeckDzEll}. Finally we remark that many recent references concerning the issues of the workshop are provided at the end of the each extended abstract. \begin{thebibliography}{99} \bibitem{Barbu} V. Barbu {\it Optimal control of Variational Inequalities} Pitman Research Notes in Mathematics {\bf 100} Pitman Boston London Melbourne (1984) \bibitem{BurgerOsher} M. Burger and S. Osher {\it A survey on level set methods for inverse problems and optimal design} Euro. J. Appl. Math. {\bf 16} (2005) 263--301 \bibitem{DeckDzEll} K.P. Deckelnick, G. Dziuk and C.M. Elliott {\it Computation of Geometric PDEs and Mean Curvature Flow} Acta Numerica (2005) 139--232 \bibitem{EllJan} C.M. Elliott and V. Janovsky {\it A variational inequality approach to Hele-Shaw flow with a moving boundary.} Proceedings of the Royal Society of Edinburgh \textbf{88A} (1981) 93 -107. \bibitem{Ell-Ock} C.M. Elliott and J.R. Ockendon {\it Weak and variational methods for moving boundary problems.} Pitman Research Notes in Mathematics {\bf 59} Pitman Boston London Melbourne 213 pp (1982). \bibitem{FasPrim} A. Fasano and M. Primicerio (editors) \textit {Free Boundary Problems, Theory Applications} Pitman Research Notes in Mathematics {\bf 79} Pitman Boston London Melbourne Pitman, London (1983). \bibitem{BossDamFrem} A. Bossavit, A. Damlamian and M. Fremond (editors) \textit {Free Boundary Problems: applications and theory} Pitman Research Notes in Mathematics {\bf 121} Pitman Boston London Melbourne Pitman, London (1985) \bibitem{HoffSprek} K.H. Hoffman and J. Sprekels (editors) \textit {Free Boundary Problems, Theory and Applications} Pitman Research Notes in Mathematics {\bf 186} Pitman Boston London MelbournePitman, London (1990) \end{thebibliography}