# Does the DFS algorithm differentiate between an ancestor and a parent while computing back edges?

Below is the general code for DFS with logic for marking back edges and tree edges. My doubt is that back edges from a vertex go back and point to an ancestor and those which point to the parent are not back edges (Lets assume undirected graph). In an undirected graph we have an edge back and forth between 2 vertices x and y. So after visiting x when I process y, y has x as an adjacent vertex but as it's already visited, the code will mark it as a back edge.

Am I right in saying that? Should we add any extra logic to avoid this in case my assumption is valid?

``````DFS(G)
for v in vertices[G] do
color[v] = white
parent[v]= nil
time = 0

for v in vertices[G] do
if color[v] = white then
DFS-Visit(v)

Induce a depth-rst tree on a graph starting at v.

DFS-Visit(v)
color[v]=gray
time=time + 1
discovery[v]=time
if color[a] = white then
parent[a] = v
DFS-Visit(a)
v->a is a tree edge
elseif color[a] = grey then
v->a is a back edge
color[v] = black
time = time + 1
``````

white means `unexplored`, gray means `frontier`, black means `processed`

-

Yes, this implementation determines `frontier` nodes only by color (visited, not visited) and, thus, doesn't separate parent and ancestor nodes. So, each edge in DFS search tree will be marked as back edge.

In order to separate tree and back edges you need to separate edges to parent and ancestor nodes. Simple way is to provide parent node as a parameter to DFS-Visit (`p`). For example:

``````DFS-Visit(v, p)
color[v]=gray
time=time + 1
discovery[v]=time
if color[a] = white then
parent[a] = v
DFS-Visit(a,v)
v->a is a tree edge
elseif color[a] = grey and (a is not p) then
v->a is a back edge
color[v] = black
time = time + 1
``````

UPDATE: I haven't noticed you already store parent nodes. So, there is no need to introduce parameter:

``````DFS-Visit(v)
color[v]=gray
time=time + 1
discovery[v]=time
if color[a] = white then
parent[a] = v
DFS-Visit(a)
v->a is a tree edge
elseif color[a] = grey and (a is not parent[v]) then
v->a is a back edge
color[v] = black
time = time + 1
``````
-
Kool that is what I was looking for i.e confirmation that the code wouldnt actually diff b/w back edge and edge from a vertex to its parent.Thanks the logic for that looks decent. –  whokares Dec 12 '12 at 8:03