In mathematics, a Voronoi diagram is a partitioning of a plane into regions based on distance to points in a specific subset of the plane. That set of points (called seeds, sites, or generators) is specified beforehand, and for each seed there is a corresponding region consisting of all points closer to that seed than to any other. These regions are called Voronoi cells. The Voronoi diagram of a set of points is dual to its Delaunay triangulation.
Keeping the start # as 0, count 100, I was playing around with the steps of the series. The result was fascinating where 6 visual types have been generated.
Base on the nature of the Voronoi cells, further transformation can be applied, such as scale, offset, extrusion, surfaces, etc.
Here I tried scaling with an attractor and extrusion from edges to the moved vertices. The idea is to look for a non-typical Voronoi construction.