Ok, I posted this question because of this exercise:

Can we modify Dijkstra’s algorithm to solve the single-source longest path problem by changing minimum to maximum? If so, then prove your algorithm correct. If not, then provide a counterexample.

For this exercise or all things related to Dijkstra's algorithm, **I assume there are no negative weights in the graph**. Otherwise, it makes not much sense, as even for shortest path problem, Dijkstra can't work properly if negative edge exists.

Ok, my intuition answered it for me:

Yes, I think it can be modified.

I just

- initialise distance array to MININT
- change
`distance[w] > distance[v]+weight`

to`distance[w] < distance[v]+weight`

Then I did some research to verify my answer. I found this post:

Longest path between from a source to certain nodes in a DAG

First I thought my answer was wrong because of the post above. But I found that maybe the answer in the post above is wrong. It mixed up **The Single-Source Longest Path Problem** with **The Longest Path Problem**.

Also in wiki of Bellman–Ford algorithm, it said correctly :

The Bellman–Ford algorithm computes single-source shortest paths in a weighted digraph.

For graphs with only non-negative edge weights, the faster Dijkstra's algorithm also solves the problem. Thus, Bellman–Ford is used primarily for graphs with negative edge weights.

So I think my answer is correct, right?
Dijkstra can really be *The Single-Source* Longest Path Problem and my modifications are also correct, right?