I'm looking for fast algorithm to compute maximum flow in dynamic graphs (adding/deleting node with related edges to graph). i.e we have maximum flow in G now new node added/deleted with related edges, I don't like to recalculate maximum flow for new graph, in fact, I want use previous available results for this graph.

Any preprocessing which isn't very time/memory consumer is appropriated.

Simplest idea is recalculating the flow.

Another simple idea is as this, save all augmenting paths which used in previous maxflow calculation, now for adding vertex `v`

, we can find simple paths (in updated capacity graph by previous step) which start from source, goes to `v`

then goes to destination, but problem is this path should be simple, I couldn't find better than O(n*E) for this case. (if it was just one path or paths was disjoint, this can be done in O(n+E), but it's not so).

Also for removing node above idea doesn't work.

Also my question is not related to another question which looks on dynamic edges adding/removing.

`n`

edges, so vertex case is more complicated than edge case, e.g I can have some intuition with edges, but my best solution for vertices is not good solution. – Saeed Amiri Jan 26 '12 at 21:38`n`

edges all connected to a single vertex, than running the linked incremental edge algorithm`n`

times? – Keith Randall Jan 26 '12 at 22:21