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The site http://web.eecs.utk.edu/~huangj/CS302S04/notes/graph-searching.html describes that when an adjacency list is used then, DFS and BFS have complexity O(V+E), and if an adjacency matrix is used, the complexity is O(V2). Why is this?

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This question appears to be off-topic because it is not about a computer program or programming language. –  Lightning Racis in Obrit Jun 6 '14 at 16:59

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up vote 2 down vote accepted

In both cases, the runtime depends on how long it takes to iterate across the outgoing edges of a given node. With an adjacency list, the runtime is directly proportional to the number of outgoing edges. Since each node is visited once, the cost is the number of nodes plus the number of edges, which is O(m + n). With am adjacency matrix, the time required to find all outgoing edges is O(n) because all n columns in the row for a node must be inspected. Summing up across all n nodes, this works out to O(n2).

Hope this helps!

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thanks a lot, i got it... i was hell confused as on wikipedia also space complexity O(n+m) was described for adjacency list and O(n^2) adjacency matrix, but time complexity was given as O(n+m)... –  jain May 29 '14 at 6:50
Consider accepting this answer as a solution if it solved your problem –  Origin Jun 4 '14 at 9:18

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