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Merge pull request #395 from Nanzz94/master
added Hamiltonian Cycle problem
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| Original file line number | Diff line number | Diff line change |
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| @@ -0,0 +1,108 @@ | ||
| #include <iostream> | ||
| #include <vector> | ||
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| using namespace std; | ||
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| // Number of vertices in the graph | ||
| #define N 5 | ||
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| // Function to print the Hamiltonian Cycle | ||
| void printCycle(const vector<int>& path) { | ||
| for (int vertex : path) | ||
| cout << vertex << " "; | ||
| // To show it's a cycle, print the first vertex again | ||
| cout << path[0] << endl; | ||
| } | ||
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| // Utility function to check if the current vertex can be added to the Hamiltonian Cycle | ||
| bool isSafe(int v, const vector<vector<int>>& graph, const vector<int>& path, int pos) { | ||
| // Check if the current vertex is adjacent to the previous vertex | ||
| if (graph[path[pos - 1]][v] == 0) | ||
| return false; | ||
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| // Check if the current vertex has already been included in the path | ||
| for (int vertex : path) | ||
| if (vertex == v) | ||
| return false; | ||
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| return true; | ||
| } | ||
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| // Recursive function to solve the Hamiltonian Cycle problem | ||
| bool hamCycleUtil(const vector<vector<int>>& graph, vector<int>& path, int pos) { | ||
| // Base case: If all vertices are included in the path | ||
| if (pos == N) { | ||
| // And if there is an edge from the last vertex to the first vertex | ||
| if (graph[path[pos - 1]][path[0]] == 1) | ||
| return true; | ||
| else | ||
| return false; | ||
| } | ||
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| // Try different vertices as the next candidate in the Hamiltonian Cycle | ||
| for (int v = 1; v < N; v++) { // Starting from 1 since 0 is the starting vertex | ||
| if (isSafe(v, graph, path, pos)) { | ||
| path[pos] = v; | ||
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| if (hamCycleUtil(graph, path, pos + 1)) | ||
| return true; | ||
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| // Backtrack if adding vertex v doesn't lead to a solution | ||
| path[pos] = -1; | ||
| } | ||
| } | ||
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| // If no vertex can be added to the Hamiltonian Cycle | ||
| return false; | ||
| } | ||
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| // Main function to solve the Hamiltonian Cycle problem | ||
| bool hamCycle(const vector<vector<int>>& graph) { | ||
| vector<int> path(N, -1); | ||
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| // Let us start at vertex 0 | ||
| path[0] = 0; | ||
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| if (!hamCycleUtil(graph, path, 1)) { | ||
| cout << "No Hamiltonian Cycle exists\n"; | ||
| return false; | ||
| } | ||
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| printCycle(path); | ||
| return true; | ||
| } | ||
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| int main() { | ||
| /* Let us create the following graph | ||
| (0)--(1)--(2) | ||
| | / \ | | ||
| | / \ | | ||
| | / \ | | ||
| (3)-------(4) | ||
| */ | ||
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| vector<vector<int>> graph1 = { | ||
| {0, 1, 0, 1, 0}, | ||
| {1, 0, 1, 1, 1}, | ||
| {0, 1, 0, 0, 1}, | ||
| {1, 1, 0, 0, 1}, | ||
| {0, 1, 1, 1, 0} | ||
| }; | ||
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| cout << "Graph 1:\n"; | ||
| hamCycle(graph1); | ||
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| // Another graph without Hamiltonian Cycle | ||
| vector<vector<int>> graph2 = { | ||
| {0, 1, 0, 1, 0}, | ||
| {1, 0, 1, 1, 1}, | ||
| {0, 1, 0, 0, 0}, | ||
| {1, 1, 0, 0, 1}, | ||
| {0, 1, 0, 1, 0} | ||
| }; | ||
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| cout << "\nGraph 2:\n"; | ||
| hamCycle(graph2); | ||
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| return 0; | ||
| } |