The Moore neighbourhood naturally extends to cellular automata in higher dimensions, for example forming a 26-cell cubic neighborhood for a cellular automaton in three dimensions. The number of cells in the Moore neighbourhood of a single cell in an n-dimensional cellular automaton is 3n-1 (Sloane's A024023).
The Moore neighbourhood of a cell can be thought of as the points at a Chebyshev distance of 1 from that cell.
The Moore neighbourhood can also be defined with a higher range; that is, so that it captures cells that are further than one cell away from the region of interest. The standard Moore neighbourhood has range 1. The Moore neighbourhood of range 2 is the set of all cells that are orthogonally or diagonally-adjacent to the Moore neighbourhood itself. The Moore neighbourhood of range n can be defined recursively as the set of all cells that are orthogonally or diagonally-adjacent to the Moore neighbourhood of range n-1. The number of cells in the Moore neighbourhood of range n is given by (2n+1)2-1 (Sloane's A033996).
- Tim Tyler. "The Moore neighbourhood". Retrieved on June 13, 2009.