1

I am working with A* algorithm. I have a 2D grid, with some obstacles, and given the starting and final position, I find the shortest path between them.

Here's my pseudocode

while(queueNotEmpty){
  removeFromPQ;
  if(removed == destination)
    found;
  insertAllNeighbours;
}

Remove and insert are the function on priority queue(Heap), and is O(log(n)) time.

Considering the dimension of grid as N*N. How do I calculate the running time. i.e how many times will this loop execute? Is there any measure?

  • Here: developer.android.com/intl/es/tools/debugging/systrace.html and here: developer.android.com/intl/es/tools/debugging/ddms.html You will find some information, hope it helps! – Jachu Apr 22 '13 at 8:00
  • It depends on the end-points and obstacles, so I'm not sure this question is answerable. – harold Apr 22 '13 at 8:06
  • The complexity is drastically dependend on your heuristic, what your pseudo code describes is actually Dijkstras algorithm which runs in O((|V|+|E|)*log(|V|) which is also the worst case of A*. – Thomas Jungblut Apr 22 '13 at 8:11
  • @harold lets say that the obstacles are perpendicular lines, but are not specific. So there's no way I could actually find an upper bound on the run time? – Kraken Apr 22 '13 at 11:49
  • Does that mean the obstacles could separate the start and goal so there is no route? In that case it would explore the entire area reachable from the start position. – harold Apr 22 '13 at 13:45
2

Runtime of standard A* is exponential in the length of the solution (worst-case).

If you're searching on a grid of n*n, and you use graph-search, the search will visit each node at most once; so it's O(n*n). But the found solution will only be optimal if the used heuristic is monotone (in addition to being admissible).

There are also conditions for polynomial runtime of standard A*.

For Graph-Search vs. Tree-Search see this answer.

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.