# Dijkstra algorithm for iPhone

It is possible to easily use the GPS functionality in the iPhone since sdk 3.0, but it is explicitly forbidden to use Google's Maps. This has two implications, I think:

1. You will have to provide maps yourself
2. You will have to calculate the shortest routes yourself.

I know that calculating the shortest route has puzzled mathematicians for ages, but both Tom Tom and Google are doing a great job, so that issue seems to have been solved. Searching on the 'net, not being a mathematician myself, I came across the Dijkstra Algorithm. Is there anyone of you who has successfully used this algorithm in a Maps-like app in the iPhone? Would you be willing to share it with me/the community? Would this be the right approach, or are the other options? Thank you so much for your consideration.

-
Couldn't you use the API for Google Maps instead and let it do the work for you? – Stefan Thyberg May 18 '09 at 7:47
That's an interesting one, that I didn't think of. Would the API be able to calculate shortest routes on roads/streets that have not been defined by Google? I mean, could I feed a custom map to it? The application I have in mind deals with a private territory, that is only vaguely defined in Maps. – Sjakelien May 18 '09 at 8:13

Dijkstra's algorithm is for finding the shortest path to all nodes (from a single starting node). Game programmers use a directed search such as A*. Where Dijkstra processes the node that is closest to the starting position first, A* processes the one that is estimated to be nearest to the end position

The way this works is that you provide a cheap "estimate" function from any given position to the end point. A good example is how far a bird would fly to get there. A* adds this to the current distance from the start for each node and then chooses the node that seems to be on the shortest path.

The better your estimate, the shorter the time it will take to find a good path. If this time is still too long, you can do a path find on a simple map and then another on a more complex map to find the route between the places you found on the simple map.

Update After much searching, I have found an article on A* for you to to read

-
Thanks for this insight. Would you know another approach? – Sjakelien May 18 '09 at 8:40
Most other approaches would be a hybrid, where you cache intermediate search data or use a clever heuristic for A* or some such. Another option would be to have your app submit searches to a server on the web with far more CPU power and ram - that server could feasibly precache lots of search results – Tom Leys May 18 '09 at 21:09

I do not believe Dijkstra's algorithm would be useful for real-world mapping because, as Tom Leys said (I would comment on his post, but lack the rep to do so), it requires a single starting point. If the starting point changes, everything must be recalculated, and I would imagine this would be quite slow on a device like the iPhone for a significantly large data set.

-
Welcome to stack overflow mitch – Tom Leys May 18 '09 at 7:55
Yes, this would be far too slow, and would require quite a lot of memory to hold the current open list (how many nodes have been visited so far, and how far they are from the start). – Tom Leys May 18 '09 at 7:56
Thank you for the welcome :) – Mitch Lindgren May 18 '09 at 7:57

Dijkstra's algorithm is O(m log n) for n nodes and m edges (for a single path) and is efficient enough to be used for network routing. This means that it's efficient enough to be used for a one-off computation.

Briefly, Dijkstra's algorithm works like:

``````Take the start node
Assign it a depth of zero
Insert it into a priority queue at its depth key

Repeat:
Pop the node with the lowest depth from the priority queue
Record the node that you came from so you can track the path back
Mark the node as having been visited
If this node is the destination:
Break
For each neighbour:
If the node has not previously been visited:
Calculate depth as depth of current node + distance to neighbour
Insert neighbour into the priority queue at the calculated depth.

Return the destination node and list of the nodes through which it was reached.
``````

Contrary to popular belief, Dijkstra's algorithm is not necessarily an all-pairs shortest path calculator, although it can be adapted to do this.

You would have to get a graph of the streets and intersections with the distances between the intersections. If you had this data you could use Dijkstra's algorithm to compute a shortest route.

-

If you look at technology tomtom calls 'IQ routes', they measure actual speed and travel time per roadstretch per time of day. This makes the arrival time more accurate. So the expected arrival time is more fact-based http://www.tomtom.com/page/iq-routes

-

Have a look at CloudMade. They offer a free service for iPhone and iPad that allows navigation based on your current location. It is built on open street maps and has some nifty features like making your own mapstyle. It is a little slow from time to time but its totally free.

-

Calculating a route using the A* algorithm is plenty fast enough on an iPhone with offline map data. I have experience of doing this commercially. I use the A* algorithm as documented on Wikipedia, and I keep the road network in memory and re-use it; once it's loaded, routing even over a large area like Spain or the western half of Canada is practically instant.

I take data from OpenStreetMap or elswhere and convert it into a directed graph, assuming (which is the right way to do it according to those who know) that any two roads sharing a point with the same ID are joined. I assign weights to different types of roads based on expected speeds, and if a portion of a road is one-way I create only a single arc; two-way roads get two arcs, one in each direction. That's pretty much the whole thing apart from some ad-hoc code to prevent dangerous turns, and implementing routing restrictions.

-