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Suppose you have a n x n gaming board and you have a character that can move like a knight on a chess board except he can't move up or left. And each block he moves to has a value which can be accumulated to his points. The player is trying to maximize points and reach T

I came up with a solution but im wondering where it could fail and its run time.

My idea was to create a directed weighted graph (points as weights) to each possible destination and run Dijkstra's algorithm on the graph, however instead of shortest path, we try and find the longest path.


I am guessing the run-time would be O (some thing + |E|+|V|log||V|)

Im not sure what something is.

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It seems to me that the graph is acyclic, in that case there are fast algorithms: ref1 ref2, ref3 –  Nabla Feb 16 '14 at 4:45
The algorithm doesn't work there can be cyclic cases –  RandomGuy Feb 16 '14 at 5:07
Hm I thought your restriction to down and right movement would make this acyclic. –  Nabla Feb 16 '14 at 5:13
I'm sorry what I meant to say was it moves like a Knight on chess board black lines on picture but its messing parts of the movement of the knight –  RandomGuy Feb 16 '14 at 5:39
Sure, got that, but I couldn't find a circle anyway. Maybe I am just missing an obvious case. –  Nabla Feb 16 '14 at 5:48

1 Answer 1

up vote 1 down vote accepted

Dijkstra is not good for finding maximum path. In ordrer to find the maximum path you should multiply each edge weight by -1 and it is well known that dijkstra does not operate correctly on graph with negative weight edges. Instead you will need to use Bellman-Ford algorithm. The complexity will then be O(| V | · | E |) as stated in the wikipedia article.

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Your answer works, but i think Dijkstra will also work because there will never be a negative edge either. I never thought of multiplying by -1 and finding shortest path, its clever. –  RandomGuy Feb 21 '14 at 16:05
@RandomGuy if you multiply all edges by -1 all edges will be negative –  Ivaylo Strandjev Feb 21 '14 at 16:46

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