I recently implemented Dijkstra's algorithm to practice Java. I'm now considering how to build random test graphs (with unidirectional edges).
Currently, I use a naive method. Nodes are created at random locations in 2d space (where x and y are unsigned integers between 0 and some MAX_SPACE constant). Edges are randomly created to connect the nodes, so that each node has an outdegree of at least 1 (and at most MAX_DEGREE). Indegree is not enforced. Then I search for a path between the first and last Nodes in the set, which may or may not be connected.
In a more realistic situation, nodes would have a probability of being connected proportional to their proximity in 2d space. What is a good strategy to build random test graphs with that property?
I will primarily use this to build graphs that can be drawn and verified by hand, but scaling to larger graphs is a consideration.
The strategy should be easily modified to support the following constants (and maybe others -- let me know if you think of any interesting ones):
- MIN_NODES, MAX_NODES: a range of sizes for the graph
- CONNECTEDNESS: average out-degree
- PROXIMITY: weight given to preferring to connect proximal nodes