# Why is the time complexity of both DFS and BFS O( V + E )

The basic algorithm for BFS:

``````set start vertex to visited

while queue not empty

for each edge incident to vertex

if its not visited

mark vertex
``````

So I would think the time complexity would be:

``````v1 + (incident edges) + v2 + (incident edges) + .... + vn + (incident edges)
``````

where `v` is vertex `1` to `n`

Firstly, is what I've said correct? Secondly, how is this `O(N + E)`, and intuition as to why would be really nice. Thanks

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``````v1 + (incident edges) + v2 + (incident edges) + .... + vn + (incident edges)
``````

can be rewritten as

``````(v1 + v2 + ... + vn) + [(incident_edges v1) + (incident_edges v2) + ... + (incident_edges vn)]
``````

and the first group is `O(N)` while the other is O(E).

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superb explanation, probably best one i have seen –  JavaDeveloper Jun 3 '14 at 19:56

DFS(analysis):

• Setting/getting a vertex/edge label takes `O(1)` time
• Each vertex is labeled twice
• once as UNEXPLORED
• once as VISITED
• Each edge is labeled twice
• once as UNEXPLORED
• once as DISCOVERY or BACK
• Method incidentEdges is called once for each vertex
• DFS runs in `O(n + m)` time provided the graph is represented by the adjacency list structure
• Recall that `Σv deg(v) = 2m`

BFS(analysis):

• Setting/getting a vertex/edge label takes O(1) time
• Each vertex is labeled twice
• once as UNEXPLORED
• once as VISITED
• Each edge is labeled twice
• once as UNEXPLORED
• once as DISCOVERY or CROSS
• Each vertex is inserted once into a sequence `Li`
• Method incidentEdges is called once for each vertex
• BFS runs in `O(n + m)` time provided the graph is represented by the adjacency list structure
• Recall that `Σv deg(v) = 2m`
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tnx for the edit i'm new here so i still try to manage with the edit screen :) –  TheNewOne Jul 13 '12 at 10:36
thanks for being specific by mentioning that the graphs are to be represented by the adjacency list structure, it was bugging me why DFS is O(n+m), I would think it was O(n + 2m) because each edge is traversed twice by backtracking. –  mib1413456 Dec 2 '14 at 12:18

Very simplified without much formality: every edgy is considered exactly twice, and every node is processed exactly once, so the complexity has to be a constant multiple of the number of edges as well as the number of vertices.

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