I know the answer to this particular question is O(V + E) and for a Graph like a tree, it makes sense because each Vertex is being explored once only.

However let's say there is a cycle in the graph.

For example, let's take up an undirected graph with four vertices A-B-C-D.

A is connected to both B and C, and Both B and C are connected to D. So there are four edges in total. A->B, A->C, B->D, C->D and vice versa.

Let's do DFS(A).

It will explore B first and B's neighbor D and D's neighbor C. After that C will not have any edges so it will come back to D and B and then A.

Then A will traverse its second edge and try to explore C and since it is already explored it will not do anything and DFS will end.

But over here Vertex "C" has been traversed twice, not once. Clearly worst case time complexity can be directly proportional to V.

Any ideas?