How to define (and solve) the diffusion equation with a sticky boundary at the origin?

Question

For the diffusion equation $\frac{\partial} {\partial t} P_t(x)=D \frac{\partial^2} {\partial x^2} P_t(x)$, a reflecting boundary at the origin for example, means: $\frac{\partial} {\partial x} P_t(x=0)=0$.

What is the mathematical way of setting the condition that whenever a particle reaches the origin it stays there forever? Note that it does not 'vanish' from the system upon reaching x=0, namely I am not talking about an absorbing boundary.

Also, how do I solve that differential equation in that case?

(Thanks for to all helpers!)

Answer 1

I would just take an absorbing boundary condition and then add the absorbed density as a delta function at the sticking point. For convenience, translate the origin so that the sticking point is $x_a>0$ and the particle starts from $x=0$ at $t=0$. The solution then is

$$P(x,t)=f(x,t)-f(2x_a-x,t)+N(t)\delta(x-x_a)$$ $$f(x,t)=(4\pi Dt)^{1/2}e^{-x^2/4Dt}$$ $$N(t)=1-{\rm erf}\,(x_a/\sqrt{4Dt})$$

see for example these lecture notes.

Answer 2

Diffusions with partially reflected (including sticky) boundary conditions are discussed in detail in

• H. J. Kushner. Probabilistic methods for finite difference approximations to degenerate elliptic and parabolic equations with neumann and dirichlet boundary conditions, J Math Anal Appl 53 (1976), no. 3, 644–668.

Kushner's proof for weak existence/uniqueness of this class of diffusions is based on the submartingale problem formulation developed in

• Stroock, D. W., and Varadhan, S. S. Diffusion processes with boundary conditions. Communications on Pure and Applied Mathematics 24.2 (1971): 147-225.

As a byproduct, Kushner also explains how to numerically solve this problem by using the Markov Chain Approximation Method.

Answer 3

I agree with kakaz and Carlo Beenakker on stitching together the counted absorbed particles and the absorbing boundary condition solution. Carlo Beenakker quoted the solution for diffusion in 1D starting from a Dirac delta function initial condition. I'd like to add that this problem was also solved in 3D for a uniform initial density in a landmark paper by Smoluchowski in 1917 (http://link.springer.com/10.1007/BF01427232) and was reviewed in English by Chandrasekhar in 1943 (https://link.aps.org/doi/10.1103/RevModPhys.15.1). The result has been used to provide diffusion-limited reaction rates for chemical reaction rates and annihilation reactions between singlet excitons. Worth a read!