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The basic algorithm for BFS:

set start vertex to visited

load it into queue

    while queue not empty

        for each edge incident to vertex

             if its not visited

                 load into queue

                 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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1  
Thanks for the question.....cleared my doubt. – Nagabhushan Baddi Jan 1 at 8:10
up vote 93 down vote accepted

Your sum

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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3  
superb explanation, probably best one i have seen – JavaDeveloper Jun 3 '14 at 19:56
    
But every vertex must be extracted from queue, and this is log(|Q|) What about this part? – Yola Jan 24 at 10:56
    
log(|Q|) < log(N) < N hence you can safely ignore the term in the asymptotic – Mihai Maruseac Jan 26 at 3:19

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 edge 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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Time complexity is O(E+V) instead of O(2E+V) because if the time complexity is n^2+2n+7 then it is written as O(n^2).

Hence, O(2E+V) is written as O(E+V)

because difference between n^2 and n matters but not between n and 2n.

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@Am_I_Helpful somebody is asking above for 2E in big-oh notation....that why 2 is not considered in time complexity. – user2466859 Sep 10 '15 at 17:38
    
@Am_I_Helpful just see the post above my answer....there the user named Kehe CAI has written "I think every edge has been considered twice and every node has been visited once, so the total time complexity should be O(2E+V)." So i answered acordingly....Got it !!! – user2466859 Sep 12 '15 at 9:59
    
I removed my downvote only because you edited your answer, – Am_I_Helpful Sep 12 '15 at 11:31

I think every edge has been considered twice and every node has been visited once, so the total time complexity should be O(2E+V).

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Even I feel the same. Can anyone give further explanation on this ? – Chaitanya Aug 4 '15 at 6:47
    
Big O analysis ignores the constant. O(2E+V) is O(E+V). – Hemm Apr 21 at 1:52

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