I am trying to find out if it is possible to use Dijkstra's algorithm to find the longest path in a directed acyclic path. I know that it is not possible to find the longest path with Dijkstra in a general graph, because of negative cost cycles. But it should work in a DAG, I think. Through Google I found a lot of conflicting sources. Some say it works in a dag and some say it does not work, but I didn't find a proof or a counter example. Can someone point me to a proof or a counter example?

I thought about the problem and I think it is not possible in general. Being acyclic is not enough, I think. For example: We want to go from a to c in this dag.
dc has length 4 ad has length 1 all others have length 2 If you just replace the min function with a max function, the algorithm will lead to abc but the longest path is adc. I found two special cases where you can use Dijkstra for calculating the longest path:



The only requirement is not to have negative cycles. If you don't have the cycles, then you can remap negative ones by adding the highest absolute value from the negative weights to all the weights. That way you will lose the negative wights, as all the weight will be equal or grater than zero. So too sum up the only thing to worry is not having a negative cycle. 


There're three possible ways to apply Dijkstra, NONE of them will work:
For DAG, critical path method will work: 


I suggest you modify the Dijkstra's algorithm to take the inverted value of the edge weight. Because the graph is acyclic, the algorithm will not enter an endless loop, using the negative weights to keep optimising. What is more, now positive weights become negative, but, again, there are no cycles. This will work even if the graph is undirected, provided that you disallow reinsertion of visited nodes (i.e., stop the endless jumping between two nodes, because adding negative value will always be better). 

