# Modified shortest path using Dijkstra's or Bellman–Ford's algorithm

How can we use Dijkstra's or Bellman–Ford's algorithm to find shortest path in a graph whose some of edges are affected if we go specific vertices. Such that, the affected edge's length will be more than or less than the original length.

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With the information you are providing there is little that can be stated. Can edge's become negative at any point? Do edge's cost get modified only when either end is visited, or also by means of third nodes being visited? Is there any other guarantee? –  David Rodríguez - dribeas Dec 25 '10 at 14:17
Can you provide an example of such affected graph? Say, edge AB has length 3, but if you also visit node C, AB's length will be 5. Is this what you mean? –  Nikita Rybak Dec 25 '10 at 14:17
@Nikita Rybak Exactly how you told; "Edge AB has length 3, but if you also visit node C, AB's length will be 5." –  Alock Leo Dec 25 '10 at 14:23
@ David Rodriguez No negative point. Not just with the end is visited, as Nikita told, any node can change any node's cost. –  Alock Leo Dec 25 '10 at 14:25
@Alock How different 'visitations' affect single edge? Say, you visited C and D, C says |AB|=5 and D says |AB|=7. –  Nikita Rybak Dec 25 '10 at 14:44