# Extension to Pathfinding - Path of fewest turns

First I want to thank anyone for taking the time to look at this. Many of us are familiar with Dijkstra's algorithm, and thus A*. I have used A* in many applications, but for this particular case I am having a very tough time coming up with an algorithm. This case involves finding the path with the fewest number of turns. Indeed, I don't even care about the "shortest" path, only the one with the least turns!I am working with an up-down-left-right grid, no diagonals, which means there are many possible solutions for shortest path. For instance, in a 5x5 grid with the starter on the bottom left and ender on the top right, we could do a stair case or go the whole way to the right then all the way up (better for me!).

With A* you use Cost = DistanceFromStart + Heuristic(Manhattan), and I have tried to extend it by adding a numTurns cost. This works perfectly until I get to a case such as the following:

| 0 0 0 0 0 * 0 0

| 0 0 1' 2' + 0 0 E

| 0 0 S 1 2 * 0 0

| 0 0 0 0 0 * 0 0

| 0 0 0 0 0 * 0 0

Please forgive the poor formatting, I hope you can see what I intended.

*'s are walls, 0's are empty, S is start and E is end. You will find that the path S->1->2->+ will give the same cost as s->1'->2'->+. They both have one turn so far, same distance from S, and same manhattan. However from the +, if we took the prime (') route, we dont have to turn. But if we took the 1 2 route, we have to turn right (+1 cost). Thus, even though we may arrive there first with 1 2, it is not the path of least turns.

I have tried adjustments such as letting multiple of the same square be in the priority queue at once such that they both get a chance (if their values are minimal in the heap). I have tried additional other "hacky" solutions, but I keep getting cases that arent covered. Does anyone know of an intuitive way to do this? Again, I'll pose the question the best I can:

Given a grid with up-down-left-right movement and obstacles, how may I find the path of least turns from A to B. I do not need the guarantee of shortest distance. The application is a bot program for a game which connects tiles and the tiles can only be eliminated if they are less than 3 turns apart. Thanks again for anyone who can help!

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Did you manage to find a solution? I'm facing the same problem and haven't find a proper solution yet. –  dimayak Dec 4 '13 at 15:06

Create a new distance matrix. For locations i and j, if they are in a straight line (no turns), set distance(i,j)=1. For the rest of the elements set to infinity. Now run any shortest distance algorithm over it.

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Am i correct in assuming this will use O(n^3) many elements of the distance graph? Every row of the initial matrix has n elements, for each of which (ignoring duplicates) you'll have to calculate n distances. There are n rows in the matrix. Analogously this goes for columns as well but addition doesn't matter in O-notation anyway. Using Dijsktra's algorithm with priority queues, this would take O(n^3 log n) time where n is the size of a row/column. –  G. Bach Feb 6 '13 at 12:38

I think you need to incorporate a 'direction' into your state. When you arrive at '+' from 1->2->+ you are facing 'up', and when you arrive at '+' from 1'->2'->+ you are facing 'right'.

You can then incorporate the cost of changing direction into your 'cost-to-go'. That is, the cost of travelling from one state to the other. Now, going 1->2->+, when estimating a move to the right, will factor in the cost of changing direction, while 1'->2'->+ will not.

When you get to the 'generate children' phase of your A*, you are probably only incrementing the 'cost-so-far' by 1, the number of gridcells it took to move to a neighbor. You also need to add 1 if the neighbor's direction to your current position is != to your current direction.

For the start, you can use some special facing direction like OMNIDIRECTIONAL, so that moving to any square from the start position doesn't incur a cost.

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Thank you for the quick response, and I await your further explaination. I do have directions on my BoardSquares, such that if my last movement was "right", and I go right again, numTurns stays the same. But, if I were to go left, down, or up, numTurns would iterate and the curDirection would change to its respective value. The problem is, unless im misunderstanding your solution, that if the 1 2 path arrives at + first, and + is picked, + is locked into place (closed list). Any further calculation from then will not know about the 1'2' path that never reached it (regardless of same cost) –  user2045279 Feb 6 '13 at 3:16
So even though turning right on 1 2 incurs a cost, and 1' 2' does not, it is not + who realizes this, it is the square to the right of +. By the time we get there, I think its too late to go back (unless we allow multiple of the same square with different heritages in the pqueue). Thanks again for taking the time to look at this with me! –  user2045279 Feb 6 '13 at 3:18
The '+' state arrived at from 1->2->+ is NOT the same '+' state as arrived at from 1'->2'->+. When you compare two states, comparing only their x,y coordinates is not enough, you must also compare the direction you are facing at those coordinates. This way, both '+' states can be added to the list, but at different costs. –  AndyG Feb 6 '13 at 3:19
I wish I could vote you up, but I need to ask more questions I guess. Your solution is the same as mine, actually. It turns out it wasn't working due to the various ways I was calling it en masse. You see, the board has nearly 100 tiles, so I call the pathfinding algorithm 50 times at minimum. I was forgetting to reset the tiles in various ways, I wasn't clearing my various data structures, etc. Therefore, the errors seemed to be coming from the pathfinding, but it was actually its bugged input. It seems to be working now (fingers crossed), and Im working on finishing the UI. –  user2045279 Feb 6 '13 at 4:10
I want to thank you again for your time. You arrived at that algorithm much faster than I did, so I wish I had asked days ago. But it's good for the brain I suppose! This is interesting stuff, and I love automation, so its fun to make a game solver. I wish you the best! –  user2045279 Feb 6 '13 at 4:12