Robin boundary condition

In mathematics, the Robin boundary condition (/ˈrɔːbɪn/; properly French: [ʁoˈbɛ̃]), or third type boundary condition, is a type of boundary condition, named after Victor Gustave Robin (1855–1897).^[1] When imposed on an ordinary or a partial differential equation, it is a specification of a linear combination of the values of a function and the values of its derivative on the boundary of the domain.

Robin boundary conditions are a weighted combination of Dirichlet boundary conditions and Neumann boundary conditions. This contrasts to mixed boundary conditions, which are boundary conditions of different types specified on different subsets of the boundary. Robin boundary conditions are also called impedance boundary conditions, from their application in electromagnetic problems.

If Ω is the domain on which the given equation is to be solved and ${\displaystyle \partial \Omega }$ denotes its boundary, the Robin boundary condition is:

${\displaystyle au+b{\frac {\partial u}{\partial n}}=g\qquad {\text{on}}~\partial \Omega \,}$

for some non-zero constants a and b and a given function g defined on ${\displaystyle \partial \Omega }$. Here, u is the unknown solution defined on ${\displaystyle \Omega }$ and ${\displaystyle {\partial u}/{\partial n}}$ denotes the normal derivative at the boundary. More generally, a and b are allowed to be (given) functions, rather than constants.

In one dimension, if, for example, ${\displaystyle \Omega =[0,1]}$, the Robin boundary condition becomes the conditions:

${\displaystyle au(0)-bu'(0)=g(0)\,}$

${\displaystyle au(1)+bu'(1)=g(1).\,}$

notice the change of sign in front of the term involving a derivative: that is because the normal to ${\displaystyle [0,1]}$ at 0 points in the negative direction, while at 1 it points in the positive direction.

Robin boundary conditions are commonly used in solving Sturm–Liouville problems which appear in many contexts in science and engineering.

In addition, the Robin boundary condition is a general form of the insulating boundary condition for convection–diffusion equations. Here, the convective and diffusive fluxes at the boundary sum to zero:

${\displaystyle u_{x}(0)\,c(0)-D{\frac {\partial c(0)}{\partial x}}=0\,}$

where D is the diffusive constant, u is the convective velocity at the boundary and c is the concentration. The second term is a result of Fick's law of diffusion.

See also

• Dirichlet boundary condition
• Neumann boundary condition
• Mixed boundary condition
• Cauchy boundary condition

References

1. Gustafson, K., (1998). Domain Decomposition, Operator Trigonometry, Robin Condition, Contemporary Mathematics, 218. 432–437.

• Gustafson, K. and T. Abe, (1998a). (Victor) Gustave Robin: 1855–1897, The Mathematical Intelligencer, 20, 47–53.

• Gustafson, K. and T. Abe, (1998b). The third boundary condition – was it Robin's?, The Mathematical Intelligencer, 20, 63–71.

• Eriksson, K. (2004). Applied mathematics, body and soul. Berlin; New York: Springer. ISBN 3-540-00889-6. {{cite book}}: Unknown parameter |coauthors= ignored (|author= suggested) (help)

• Atkinson, Kendall E. (2001). Theoretical numerical analysis: a functional analysis framework. New York: Springer. ISBN 0-387-95142-3. {{cite book}}: Unknown parameter |coauthors= ignored (|author= suggested) (help)

• Eriksson, K. (1996). Computational differential equations. Cambridge; New York: Cambridge University Press. ISBN 0-521-56738-6. {{cite book}}: Unknown parameter |coauthors= ignored (|author= suggested) (help)

• Mei, Zhen (2000). Numerical bifurcation analysis for reaction-diffusion equations. Berlin; New York: Springer. ISBN 3-540-67296-6.