# Adjustment to a shortest path algorithm

for a datastructures & algorithms class in college we have to implement an algorithm presented in a paper. The paper can be found here. So i fullly implemented the algorithm, with still some errors left (but that's not really why I'm asking this question, if you want to see how I implemented it thus far, you can find it here)

The real reason why I'm asking a question on Stackoverflow is the second part of the assignment: we have to try to make the algorithm better. I had a few ways in mind, but all of them sound good in theory but they won't really do good in practice:

• Draw a line between the source and end node, search the node closest to the middle of that line and divide the "path" in 2 recursively. The base case would be a smaller graph were a single Dijkstra would do the computation. This isn't really an adjustment to the current algorithm but with some thinking it is clear this wouldn't give an optimal solution.
• Try to give the algorithm some sense of direction by giving a higher priority to edges that point to the end node. This also won't be optimal..

So now I'm all out of ideas and hoping that someone here could give me a little hint for a possible adjustment. It doesn't really have to improve the algorithm, I think the first reason why they asked us to do this is so we don't just implement the algorithm from the paper without knowing what's behind it.

(If Stackoverflow isn't the right place to ask this question, my apologies :) )

A short description of the algorithm: The algorithm tries to select which nodes look promising. By promising I mean that they have a good chance on lying on a shortest path. How promising a node is is represented by it's 'reach'. The reach of a vertex on a path is the minimum of it's distances to the start and to the end. The reach of a vertex in a graph is the maximum of the reaches of the vertex on all shortest paths. To eventually determine whether a node is added to the priority queue in Dijkstra's algorithm, a test() function is added. Test returns true (if the reach of a vertex in the graph is larger or equal then the weight of the path from the origin to v at the time v is to be inserted in the priority queue) or (the reach of the vertex in the graph is larger or equal then the euclidean distance from v to the end vertex).

Harm De Weirdt

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Since this isn't directly related to a specific problem in programming, I suggest you move this question to cstheory.stackexchange.com. –  Shamim Hafiz Dec 12 '10 at 9:20
Please add a short description of your algorithm here - not merely a link that might disappear in the future. –  Adam Matan Dec 12 '10 at 9:25