I'm developing a path finding program. It is said theoretically that A* is better than Dijkstra. In fact, the latter is a special case of the former. However, when testing in the real world, I begin to doubt that is A* really better?

I used data of New York City, from *9th DIMACS Implementation Challenge - Shortest Paths*, in which each node's latitude and longitude is given.

When applying A*, I need to calculate the spherical distance between two points, using Haversine Formula, which involves sin, cos, arcsin, square root. All of those are very very time-consuming.

The result is,

Using Dijkstra: 39.953 ms, expanded 256540 nodes.

Using A*, 108.475 ms, expanded 255135 nodes.

Noticing that in A*, we expanded less 1405 nodes. However, the time to compute a heuristic is much more than that saved.

To my understanding, the reason is that in a very large real graph, the weight of the heuristic will be very small, and the effect of it can be ignored, while the computing time is dominating.

`It is said theoretically that A* is better than Dijkstra`

-- Citation, please. Also, by "better," you really mean faster, right? Do you mean faster as in Big O faster? – Robert Harvey♦ Apr 15 '13 at 16:36`h(node) = 1 and h(goal) = 0`

. A* is then reduced to dijkstra. So since A* can emulate dijkstra, it's either equally powerful or better. – Shahbaz Apr 15 '13 at 16:46