What is the Best oder of traversing edges within Bellman-Ford algorithm in Order to achieve a min. number of iterations necessary.?
thx in advance, Andreas
If the graph is acyclic the best way is traverse the vertices in topological order. This means only one iteration of the algorithm is necessary.
For cyclic graphs without negative edges you can use a generic shortest path algorithm as described in this pdf (sssp.pdf) with a Fifo queue, this can visit fewer vertices than the standard Bellman-ford algorithm which loops over vertices and then edges. In practice the Fifo queue approach is often faster than using a priority queue (Dijkstra) as mentioned in this answer ( Are there faster algorithms than Dijkstra? ). However, a dis-advantage of this approach is the unlike the standard Bellman-ford algorithm this algorithm will not terminate if the graph has negative cycles.