Delaunay triangulation is a method of dividing a set of points in a plane into non-overlapping triangles, such that no point is inside the circumcircle of any other triangle.
In the context of cell biology, Delaunay triangulation can be used to model the arrangement of cells in a tissue or organ. The points represent the locations of the cell centers and the triangles represent the connections between the cells.
This mathematical principle is important in understanding how cells interact with each other and how they form organized structures. It has applications in tissue engineering, drug design, and other areas of biology.
