During an assignment I wanted to find the longest circular path for a given length. Use the image below as an example. We want to find the longest possible circular path of a given length.
e.g. for length 3 the longest circular path is DBED or EDBE.
I proposed as a way to find the longest path a modified version of Dijkstra. The differences are:
Instead of min is searching for the max in each step.
When the step is length-1 the algorithm stops and goes back to the starting point and add the distance from the last point to the total path length.
Do it with every node as a starting point.
I have checked the algorithm for 6 nodes and length up to 5 and it worked, but I cannot check if it's true for a larger number like 100.
My professor said that Dijkstra is not what you looking for for that problem and an algorithm finding Hamiltonian circuits would be more effective. I believe he is right and as in a lot of threads as Dijkstra's algorthm modification people pointed that Dijkstra's algorithm is not capable of finding the longest path.
But although it is true that Dijkstra is not what I am looking for; the above case is a very special case because all nodes are connected and the modified version checks for every point as a staring point and also a circular path for a given length.
Finally, my question is why the modified version can't find the right solution for this and only this special case.