Alternating direction implicit method

The method

Consider the linear diffusion equation in two dimensions,

The implicit Crank–Nicolson method produces the following finite difference equation:

where δ p is the central difference operator for the p-coordinate. After performing a stability analysis, it can be shown that this method will be stable for any Δ t .

A disadvantage of the Crank–Nicolson method is that the matrix in the above equation is banded with a band width that is generally quite large. This makes direct solution of the system of linear equations quite costly (although efficient approximate solutions exist, for example use of the conjugate gradient method preconditioned with incomplete Cholesky factorization).

The idea behind the ADI method is to split the finite difference equations into two, one with the x-derivative taken implicitly and the next with the y-derivative taken implicitly,

The system of equations involved is symmetric and tridiagonal (banded with bandwidth 3), and is typically solved using tridiagonal matrix algorithm.

It can be shown that this method is unconditionally stable and second order in time and space. There are more refined ADI methods such as the methods of Douglas, or the f-factor method which can be used for three or more dimensions.

Generalizations

The usage of the ADI method as an operator splitting scheme can be generalized. That is, we may consider general evolution equations

where F 1 and F 2 are (possibly nonlinear) operators defined on a Banach space. In the diffusion example above we have F 1 = ∂ 2 u ∂ x 2 and F 2 = ∂ 2 u ∂ y 2 .