# what are root cut nodes,bridge cut nodes, parent cut nodes in finding the aritculation vertices?

what are root cut nodes,bridge cut nodes, parent cut nodes in finding the aritculation vertices? can somebody explain it with examples please. I am getting confused with the bridge cut nodes in particular. its defination says

If the earliest reachable vertex from v is v, then deleting the single edge (parent[v], v) disconnects the graph

How could the earliest reachable vertex from v be v ?

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where did you get that definition? –  Origin Dec 15 '12 at 21:14
I am reading it form skiena's algorithm design manual.It initializes the earliest reachable vertex of each node to itself and after the graph is traversed using dfs if it remains unchanged then its a bridge node. –  jairaj Dec 16 '12 at 0:50

Don't know if you still care, but I'm reading the same text right now

Root Cut-Node

I think a root cut-node is pretty obvious

Bridge Cut-Node

Remember to change v's reachable_ancestor the three following conditions must be met:

• there is an edge (v, y) that is a back edge
• for the edge (v, y), y is not the parent of v
• entry_time of y is before the entry_time of v's reachable_ancestor

So if you look at Figure 5.13 of the book, you'll see that because the one (lower on the tree) bridge-cut node has no parent that is not y, it will never have it's reachable_ancestor changed from the initial reachable_ancestor[v] = v. Which in turn makes it's parent a bridge-cut node and (only because it is not a leaf) makes that node also a bridge-cut node.

Parent Cut-Node

The reason in Figure 5.13 that v's parent is a parent cut-node (as opposed to a bridge cut-node) is because bridges must meet the following conditions:

• The edge is a tree edge
• No back edges connect from v or below to y or above

Clearly in the graph, children of v connect back up to it's parent (y) and above, making the edge between v and y not an bridge, but making y still a cut-node.

Hope that helped!

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Thank you for the clarification @gonzofish –  Eddie Oct 21 '13 at 20:15