Using the voronoi/delaunay diagram generation library found in this program, which is based on Fortune's original implementation of his algorithm, with a random set of points as input data, I am able to get the following output data:

**A list of the edges from the Delaunay Triangulation**, meaning that for each input point, I can see which input points are its neighbors. They don't appear to be in any particular order.**A list of the vertex pairs from the Voronoi Diagram**, which I can use to draw the Voronoi diagram one line at a time. Again, apparently in no particular order.**An unnamed list of pairs of points**, which seems to just be the same list as 2, but in a different order.**A list of the vertices formed in the Voronoi Diagram**, also apparently in no particular order.

Here is an example of data from a test run of my program using this library:

```
Input points:
0 (426.484, 175.16)
1 (282.004, 231.388)
2 (487.891, 353.996)
3 (50.8574, 5.02996)
4 (602.252, 288.418)
Vertex Pairs:
0 (387.425, 288.533) (277.142, 5.15565)
1 (387.425, 288.533) (503.484, 248.682)
2 (277.142, 5.15565) (0, 288.161)
3 (387.425, 288.533) (272.213, 482)
4 (503.484, 248.682) (637.275, 482)
5 (503.484, 248.682) (642, 33.7153)
6 (277.142, 5.15565) (279.477, 0)
Voronoi lines?:
0 (279.477, 0) (277.142, 5.15565)
1 (642, 33.7153) (503.484, 248.682)
2 (503.484, 248.682) (637.275, 482)
3 (387.425, 288.533) (272.213, 482)
4 (277.142, 5.15565) (0, 288.161)
5 (387.425, 288.533) (503.484, 248.682)
6 (277.142, 5.15565) (387.425, 288.533)
Delaunay Edges:
0 (282.004, 231.388) (487.891, 353.996)
1 (602.252, 288.418) (487.891, 353.996)
2 (426.484, 175.16) (487.891, 353.996)
3 (426.484, 175.16) (602.252, 288.418)
4 (50.8574, 5.02996) (282.004, 231.388)
5 (426.484, 175.16) (282.004, 231.388)
6 (50.8574, 5.02996) (426.484, 175.16)
Vertices:
0 (277.142, 5.15565)
1 (503.484, 248.682)
2 (387.425, 288.533)
3 (0, 288.161)
4 (272.213, 482)
5 (637.275, 482)
6 (642, 33.7153)
7 (279.477, 0)
```

While the above data is adequate if all I need is to draw the Voronoi and Delaunay diagrams, it is not enough information for the actual work I am trying to do with these diagrams. **What I need is a dictionary of polygons formed by the Voronoi vertices, indexed by the input point that each polygon was formed around.** Preferably, for each polygon, these points would be sorted in clockwise order.

With the above information, I could implicitly assign data to each region, assign data to corners if necessary, tell which regions share edges (using the Delaunay edges), and do analysis accordingly.

So in short, **how can I use the data available to me to put together a dictionary in which the key is one of the input points, and the data indexed by that key is a list of the Voronoi vertices that form the surrounding polygon?** Or alternatively, is that information somewhere implicit in the data I've been given?