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Minimum Spanning Trees. Minimum Spanning Tree. Problem: given a connected, undirected, weighted graph. 6. 4. 5. 9. 14. 2. 10. 15. 3. 8. Minimum Spanning Tree. Problem: given a connected, undirected, weighted graph, find a spanning tree using edges that minimize the total weight. 6.
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Minimum Spanning Tree • Problem: given a connected, undirected, weighted graph 6 4 5 9 14 2 10 15 3 8
Minimum Spanning Tree • Problem: given a connected, undirected, weighted graph, find a spanning tree using edges that minimize the total weight 6 4 5 9 14 2 10 15 3 8
Minimum Spanning Tree Number of edges = |V| -1 Acyclic Minimum total weight
Minimum Spanning Tree • Which edges form the minimum spanning tree (MST) of this graph? A 6 4 5 9 H B C 14 2 10 15 G E D 3 8 F
Minimum Spanning Tree • Answer: A 6 4 5 9 H B C 14 2 10 15 G E D 3 8 F
Minimum Spanning Tree • Applications • Design of networks • Design of electrical circuits • Airline routes
Minimum Spanning Tree • Thm: (Light Edges are in MST) • Let T be MST of G, and let A T be subtree of T • Let (u,v) be min-weight edge connecting A to V-A • Then (u,v) T
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v);
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 14 2 10 15 3 8 Run on example graph
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 14 2 10 15 3 8 Run on example graph
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 14 2 10 15 r 0 3 8 Pick a start vertex r
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 14 2 10 15 u 0 3 8 Grey vertices have been removed from Q
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 14 2 10 15 u 0 3 8 3 Red arrows indicate parent pointers
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 14 14 2 10 15 u 0 3 8 3
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 14 14 2 10 15 0 3 8 3 u
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 14 14 2 10 15 0 8 3 8 3 u
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 10 14 2 10 15 0 8 3 8 3 u
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 10 14 2 10 15 0 8 3 8 3 u
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 10 2 14 2 10 15 0 8 3 8 3 u
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 10 2 14 2 10 15 0 8 15 3 8 3 u
Prim’s Algorithm u MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 10 2 14 2 10 15 0 8 15 3 8 3
Prim’s Algorithm u MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 6 4 9 5 10 2 9 14 2 10 15 0 8 15 3 8 3
Prim’s Algorithm u MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 4 6 4 9 5 10 2 9 14 2 10 15 0 8 15 3 8 3
Prim’s Algorithm u MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 4 6 4 9 5 5 2 9 14 2 10 15 0 8 15 3 8 3
Prim’s Algorithm u MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 4 6 4 9 5 5 2 9 14 2 10 15 0 8 15 3 8 3
Prim’s Algorithm u MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 4 6 4 9 5 5 2 9 14 2 10 15 0 8 15 3 8 3
Prim’s Algorithm u MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 4 6 4 9 5 5 2 9 14 2 10 15 0 8 15 3 8 3
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); 4 6 4 9 5 5 2 9 u 14 2 10 15 0 8 15 3 8 3
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); What is the hidden cost in this code?
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; DecreaseKey(v, w(u,v));
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; DecreaseKey(v, w(u,v)); How often is ExtractMin() called? How often is DecreaseKey() called?
Prim’s Algorithm MST-Prim(G, w, r) Q = VG; for each u Q key[u] = ; key[r] = 0; p[r] = NULL; while (Q not empty) u = ExtractMin(Q); for each v Adj[u] if (v Q and w(u,v) < key[v]) p[v] = u; key[v] = w(u,v); What will be the running time? Using heap: O(E lg V)