I'm writing a courier/logistics simulation on OpenStreetMap maps and have realised that the basic A* algorithm as pictured below is not going to be fast enough for large maps (like Greater London).
The green nodes correspond to ones that were put in the open set/priority queue and due to the huge number (the whole map is something like 1-2 million), it takes 5 seconds or so to find the route pictured. Unfortunately 100ms per route is about my absolute limit.
Currently, the nodes are stored in both an adjacency list and also a spatial 100x100 2D array.
I'm looking for methods where I can trade off preprocessing time, space and if needed optimality of the route, for faster queries. The straight-line Haversine formula for the heuristic cost is the most expensive function according to the profiler - I have optimised my basic A* as much as I can.
For example, I was thinking if I chose an arbitrary node X from each quadrant of the 2D array and run A* between each, I can store the routes to disk for subsequent simulations. When querying, I can run A* search only in the quadrants, to get between the precomputed route and the X.
Is there a more refined version of what I've described above or perhaps a different method I should pursue. Many thanks!
For the record, here are some benchmark results for arbitrarily weighting the heuristic cost and computing the path between 10 pairs of randomly picked nodes:
Weight // AvgDist% // Time (ms) 1 1 1461.2 1.05 1 1327.2 1.1 1 900.7 1.2 1.019658848 196.4 1.3 1.027619169 53.6 1.4 1.044714394 33.6 1.5 1.063963413 25.5 1.6 1.071694171 24.1 1.7 1.084093229 24.3 1.8 1.092208509 22 1.9 1.109188175 22.5 2 1.122856792 18.2 2.2 1.131574742 16.9 2.4 1.139104895 15.4 2.6 1.140021962 16 2.8 1.14088128 15.5 3 1.156303676 16 4 1.20256964 13 5 1.19610861 12.9
Surprisingly increasing the coefficient to 1.1 almost halved the execution time whilst keeping the same route.