If necessary, the finite difference can be centered about any point by mixing forward, backward, and central differences.

This shows how finite differences arise naturally in quantum geometry.

The balance can then be solved at each mesh point using finite difference or by nodal methods.

Similar relationships were also observed in the theory of finite differences.

This is the case for the finite difference, the functions sinc or wavelets.

By using the method of finite differences, it was possible to avoid the need for multiplication and division.

A finite difference can be central, forward or backward.

It is possible to approximate the partial derivatives using finite differences.

The most attractive feature of finite differences is that it can be very easy to implement.

For finite differences, a grid is imposed on the atmosphere.