# Improving A* algorithm

Say I am finding a path in a house using A* algorithm. Now the running time could be O(n^2).

I was thinking will it improve the performance if I knew which doors to follow and according I shall apply A* on it i.e. if I have the starting position `S` and final position as `F`, and instead of applying the A* on these two end points, will be be better if I applied the A* on

```````S` and `A1`
`A1` and `A2`
`A2` and F.
``````

Where A1 and A2 are my intermediates(doors) that shall be followed for the shortest path? Will it be worth the improvement to find the intermediates and then follow the path and not just apply A* directly on starting and ending.

Considering it takes linear time to find the intermediates.

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How do you guarantee it takes linear time to find the intermediates? Do you relax the optimality requirement? –  us2012 Mar 4 '13 at 12:26
@us2012 yea, that is what will take me linear time to find out, if I have the correct representation of my data. After that I can just move within a room till the intermediates and subsequently reaching the end. –  hilAs Mar 4 '13 at 12:26

Yes, that will help a lot in case the algorithm takes `O(n^2)` behavior at runtime. Instead of one big problem you get two smaller problems with each being 1/4 as expensive to compute.