# What are some good methods to finding a heuristic for the A* algorithm?

You have a map of square tiles where you can move in any of the 8 directions. Given that you have function called `cost(tile1, tile2)` which tells you the cost of moving from one adjacent tile to another, how do you find a heuristic function h(y, goal) that is both admissible and consistent? Can a method for finding the heuristic be generalized given this setting, or would it be vary differently depending on the `cost` function?

Amit's tutorial is one of the best I've seen on A* (Amit's page). You should find some very useful hint about heuristics on this page .

On a square grid that allows 8 directions of movement, use Diagonal distance (L∞).

• This still depends on your cost function for moving to an adjacent square. Apr 16, 2011 at 16:43

It depends on the cost function.

There are a couple of common heuristics, such as Euclidean distance (the absolute distance between two tiles on a 2d plane) and Manhattan distance (the sum of the absolute x and y deltas). But these assume that the actual cost is never less than a certain amount. Manhattan distance is ruled out if your agent can efficiently move diagonally (i.e. the cost of moving to a diagonal is less than 2). Euclidean distance is ruled out if the cost of moving to a neighbouring tile is less than the absolute distance of that move (e.g. maybe if the adjacent tile was "downhill" from this one).

## Edit

Regardless of your cost function, you always have an admissable and consistent heuristic in `h(t1, t2) = -∞`. It's just not a good one.

Yes, the heuristic is dependent on the cost function, in a couple of ways. First, it must be in the same units. Second, you can't have a lower-cost path through actual nodes than the cost of the heuristic.

In the real world, used for things like navigation on a road network, your heuristic might be "the time a car would take on a direct path at 1.5x the speed limit." The cost for each road segment would use the actual speed limit, which will give a higher cost.

So, what is your cost function between tiles? Is it based on physical properties, or defined outside of your graph?

• A better heuristic is 'the time a car would take if there was a motorway (road with the highest speed limit) in a straight line to the destination'. There is no need to apply the factor of 1.5. Feb 23, 2017 at 21:35