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We are given the adjacency list for a multigraph, G = (V, E) and need to find an O(V + E) algorithm to compute the adjacency list of an equivalent undirected graph.

So far, I have thought of having an array of size |V| so as to mark the vertices that have been encountered at least once in adj[u], and thus preventing duplicates. The array is reset before traversing each adj[u]. But, I want to know if there exists a better algorithm for this that does not use extra space. Please suggest.

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2 Answers 2

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If you want to achieve O(V+E) time complexity, there is no better algorithm, because this is basically a variation of the element distinctness problem, which can be solved by sorting in O(nlogn), or by using O(n) extra space in O(n).

So, to achieve O(V+E) time, your algorithm is optimal (in terms of big O notation)

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You could use a unordered set datastructure to improve from O(n) extra space to O(max number of neighbors) by only checking that no neighbor is added twice to the adjacency list.

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