There is a spoj problem where you need to find the diameter of the MDST for a given graph. The graph is undirected, connected and unweighted. There are up to 1000 nodes, but no bound is given on the number of edges. (the solution I found online looped through all the edges and than all the nodes, and got AC. I think its thus safe to assume the number of edges is O(n))
From what I've read online here's the logic of the solution:
find the shortest distance
dist[u][v]from each node to each other node (done in O(n^2), with bfs from each node)brute force the center of the MDST
1.If the center of the MDST is a node v, I find the node u such that dist[v][u] is maximal. -> The diameter if v is center will be2*dist[v][u]I keep a variable mdst as the minimum diameter I have found so far.mdst = INF; for(v = 0 to N){ mx = 0 for(u = 0 to N) mx = max(mx, dist[v][u]) mdst = min(mdst, 2*mx) }2.If the center of the MDST is an edge e = (u, v) I find the node x such that min(dist[u][x], dist[v][x]) is maximal. -> the diameter if e is the center will be2*min(dist[u][x], dist[v][x]) + 1for((u, v) : edges){ mx = 0 for(x = 0 to N) mx = max(mx, min(dist[u][x], dist[v][x])) mdst = min(mdst, 2*mx) }
In either of the above cases, if the chosen node/edge is not the center of the MDST, the resulting diameter I find will be strictly greater than that of the actual MDST. On the other hand if the chosen node/edge is the center of the MDST, I should find the correct diameter.
Above I give an explanation to why this solution works, but it relies on the fact : if the chosen node/edge is not the center of the MDST, the resulting diameter I find will be strictly greater than that of the actual MDST which I didn't prove.
I have worked out a proof on paper for why this is true, but I'm not sure how to write it down formally here so I will not try to do so. I recommend you try to prove it yourself, if you are struggling write a message to me and I will try to help with what I can.
