In mathematics, a free boundary problem (FB problem) is a partial differential equation to be solved for both an unknown function
u
\Omega
\Gamma
\Omega
FBs arise in various mathematical models encompassing applications that ranges from physical to economical, financial and biological phenomena, where there is an extra effect of the medium. This effect is in general a qualitative change of the medium and hence an appearance of a phase transition: ice to water, liquid to crystal, buying to selling (assets), active to inactive (biology), blue to red (coloring games), disorganized to organized (self-organizing criticality). An interesting aspect of such a criticality is the so-called sandpile dynamic (or Internal DLA).
The most classical example is the melting of ice: Given a block of ice, one can solve the heat equation given appropriate initial and boundary conditions to determine its temperature. But, if in any region the temperature is greater than the melting point of ice, this domain will be occupied by liquid water instead. The boundary formed from the ice/liquid interface is controlled dynamically by the solution of the PDE.
The melting of ice is a Stefan problem for the temperature field
T
\Omega
T>0
T<0
\alpha1
\alpha2
In the regions consisting solely of one phase, the temperature is determined by the heat equation: in the region
T>0
| \partialT | |
| \partialt |
=\nabla ⋅ (\alpha1\nablaT)+Q
T<0
| \partialT | |
| \partialt |
=\nabla ⋅ (\alpha2\nablaT)+Q.
\Omega
Q
Let
\Gammat
T=0
t
\nu
\Gamma
V
\nu
LV=\alpha1\partial\nuT1-\alpha2\partial\nuT2,
L
T1
x
\Gammat
T>0
T2
x
\Gammat
T<0
In this problem, we know beforehand the whole region
\Omega
\Gamma
t=0
\Gamma
The one-phase Stefan problem corresponds to taking either
\alpha1
\alpha2
Another famous free-boundary problem is the obstacle problem, which bears close connections to the classical Poisson equation. The solutions of the differential equation
-\nabla2u=f, u|\partial\Omega=g
satisfy a variational principle, that is to say they minimize the functional
E[u]=
| 1 | |
| 2 |
\int\Omega|\nablau|2dx-\int\Omegafudx
over all functions
u
g
E
u\le\varphi
in
\Omega
\varphi
Define the coincidence set C as the region where
u=\varphi
N=\Omega\setminusC
u
\varphi
\Gamma
u
-\nabla2u=finN, u=g
on the boundary of
\Omega
u\le\varphiin|\Omega, \nablau=\nabla\varphion\Gamma.
Note that the set of all functions
v
v\leq\varphi
Many free boundary problems can profitably be viewed as variational inequalities for the sake of analysis. To illustrate this point, we first turn to the minimization of a function
F
n
C
x
\nablaF(x) ⋅ (y-x)\ge0forally\inC.
If
x
C
F
x
C
F
x
The same idea applies to the minimization of a differentiable functional
F
| 2 | |
| \int | |
| \Omega(\nabla |
u+f)(v-u)dx\ge0forallv\le\varphi.
This formulation permits the definition of a weak solution: using integration by parts on the last equation gives that
\int\Omega\nablau ⋅ \nabla(v-u)dx\le\int\Omegaf(v-u)dxforallv\le\varphi.
This definition only requires that
u
In the theory of elliptic partial differential equations, one demonstrates the existence of a weak solution of a differential equation with reasonable ease using some functional analysis arguments. However, the weak solution exhibited lies in a space of functions with fewer derivatives than one would desire; for example, for the Poisson problem, we can easily assert that there is a weak solution which is in H1
, but it may not have second derivatives. One then applies some calculus estimates to demonstrate that the weak solution is in fact sufficiently regular.
For free boundary problems, this task is more formidable for two reasons. For one, the solutions often exhibit discontinuous derivatives across the free boundary, while they may be analytic in any neighborhood away from it. Secondly, one must also demonstrate the regularity of the free boundary itself. For example, for the Stefan problem, the free boundary is a
C1/2
From a purely academic point of view free boundaries belong to a larger class of problems usually referred to as overdetermined problems, or as David Kinderlehrer and Guido Stampacchia addressed it in their book: The problem of matching Cauchy data. Other related FBP that can be mentioned are Pompeiu problem, Schiffer’s conjectures. See the external links below.
Another approach used to model similar problems is the Phase-field model.