# Shortest Paths with One negative edge

Let G(V,E) be a directed connected graph with no negative cycles in it. All the edges have non-negative weight, except ONE edge. Find a simple shortest path from s,t in V.

My idea -

1. Do a BFS on the graph, find the edge with the negative weight.
2. Add this negative weight to all the edges, so we eliminate the negative weight.
3. Do Dijkstra algorithm.

My idea doesn't work.

Thank you.

The reason that your approach doesn't work is that it unfairly penalizes paths with more edges.

Imagine two paths from a source node to a destination, one with more edges, but lower weight, and another with a fewer edges with higher weight. Let's assume that the weight added to each edge is 3.

Original paths:

``````S -> 1 -> 1 -> 1 -> 1 -> 1 -> T    wt = 5
S -> 4 -> 3 -> T                   wt = 7
``````

Paths after adding weight:

``````S -> 4 -> 4 -> 4 -> 4 -> 4 -> T    wt = 20
S -> 7 -> 6 -> T                   wt = 13
``````

As you can see, the second path is now incorrectly identified as the shorter one.