Dots vesels skaitlis n uzdevums ir visu atrast atšķirīgi risinājumi uz n-queens problēma kur n karalienes tiek novietotas uz an n * n šaha galds tā, lai divas karalienes nevarētu uzbrukt viena otrai.
alfa beta atzarošana
Piezīme: Katrs risinājums ir unikāla konfigurācija n karalienes attēlotas kā permutācija [123....n] . Numurs pie i th pozīcija norāda karalienes rindu i th kolonnu. Piemēram [3142] parāda vienu šādu izkārtojumu.
Piemērs:
Ievade: n = 4
Izvade: [2 4 1 3] [3 1 4 2]
Paskaidrojums: Šie ir 2 iespējamie risinājumi.Ievade: n = 2
Izvade: []
Paskaidrojums: Nav risinājuma, jo karalienes var uzbrukt viena otrai visās iespējamās konfigurācijās.
Satura rādītājs
- [Naīvā pieeja] ģenerējot visas permutācijas, izmantojot rekursiju
- [Paredzamā pieeja] Atkāpšanās izmantošana ar atzarošanu
- [Alternatīva pieeja] Atkāpšanās, izmantojot bitu maskēšanu
[Naīvā pieeja] — Rekursijas izmantošana — O(n! * n) laiks un O(n) telpa
Vienkārša ideja, kā atrisināt N-Queens problēma ir ģenerēt visas iespējamās permutācijas [1 2 3 ... n] un pēc tam pārbaudiet, vai tā ir derīga N-Queens konfigurācija. Tā kā katrai karalienei ir jāatrodas citā rindā un kolonnā izmantojot permutācijas automātiski rūpējas par šiem noteikumiem. Bet mums joprojām ir jāpārbauda, vai nav divu karalienes tā pati diagonāle.
string of int
Zemāk ir dota īstenošana:
C++//C++ program to find all solution of N queen problem //using recursion #include
//Java program to find all solution of N queen problem //using recursion import java.util.ArrayList; class GfG { // Check if placement is safe static boolean isSafe(ArrayList<Integer> board int currRow int currCol) { for(int i = 0; i < board.size(); i++) { int placedRow = board.get(i); int placedCol = i + 1; // Check diagonals if(Math.abs(placedRow - currRow) == Math.abs(placedCol - currCol)) { return false; // Not safe } } return true; // Safe to place } // Recursive utility to solve static void nQueenUtil(int col int n ArrayList<Integer> board ArrayList<ArrayList<Integer>> res boolean[] visited) { // If all queens placed add to res if(col > n) { res.add(new ArrayList<>(board)); return; } // Try each row in column for(int row = 1; row <= n; row++) { // If row not used if(!visited[row]) { // Check safety if(isSafe(board row col)) { // Mark row visited[row] = true; // Place queen board.add(row); // Recur for next column nQueenUtil(col + 1 n board res visited); // Backtrack board.remove(board.size()-1); visited[row] = false; } } } } // Function to solve N-Queen static ArrayList<ArrayList<Integer>> nQueen(int n) { ArrayList<ArrayList<Integer>> res = new ArrayList<>(); ArrayList<Integer> board = new ArrayList<>(); boolean[] visited = new boolean[n +1]; nQueenUtil(1 n board res visited); return res; } public static void main(String[] args) { int n = 4; ArrayList<ArrayList<Integer>> res = nQueen(n); for(ArrayList<Integer> row : res) { System.out.print('['); for(int i = 0; i < row.size(); i++) { System.out.print(row.get(i)); if(i != row.size()-1) System.out.print(' '); } System.out.println(']'); } } }
#Python program to find all solution of N queen problem #using recursion # Function to check if placement is safe def isSafe(board currRow currCol): for i in range(len(board)): placedRow = board[i] placedCol = i + 1 # Check diagonals if abs(placedRow - currRow) == abs(placedCol - currCol): return False # Not safe return True # Safe to place # Recursive utility to solve N-Queens def nQueenUtil(col n board res visited): # If all queens placed add to res if col > n: res.append(board.copy()) return # Try each row in column for row in range(1 n+1): # If row not used if not visited[row]: # Check safety if isSafe(board row col): # Mark row visited[row] = True # Place queen board.append(row) # Recur for next column nQueenUtil(col+1 n board res visited) # Backtrack board.pop() visited[row] = False # Main N-Queen solver def nQueen(n): res = [] board = [] visited = [False] * (n + 1) nQueenUtil(1 n board res visited) return res if __name__ == '__main__': n = 4 res = nQueen(n) for row in res: print(row)
//C# program to find all solution of N queen problem //using recursion using System; using System.Collections.Generic; class GfG { // Check if placement is safe static bool isSafe(List<int> board int currRow int currCol){ for (int i = 0; i < board.Count; i++) { int placedRow = board[i]; int placedCol = i + 1; // Check diagonals if (Math.Abs(placedRow - currRow) == Math.Abs(placedCol - currCol)) { return false; // Not safe } } return true; // Safe to place } // Recursive utility to solve static void nQueenUtil(int col int n List<int> board List<List<int> > res bool[] visited){ // If all queens placed add to res if (col > n) { res.Add(new List<int>(board)); return; } // Try each row in column for (int row = 1; row <= n; row++) { // If row not used if (!visited[row]) { // Check safety if (isSafe(board row col)) { // Mark row visited[row] = true; // Place queen board.Add(row); // Recur for next column nQueenUtil(col + 1 n board res visited); // Backtrack board.RemoveAt(board.Count - 1); visited[row] = false; } } } } // Main N-Queen solver static List<List<int>> nQueen(int n){ List<List<int> > res = new List<List<int> >(); List<int> board = new List<int>(); bool[] visited = new bool[n + 1]; nQueenUtil(1 n board res visited); return res; } static void Main(string[] args) { int n = 4; List<List<int>> res = nQueen(n); foreach (var temp in res) { Console.WriteLine('[' + String.Join(' ' temp) + ']'); } } }
//JavaScript program to find all solution of N queen problem //using recursion // Function to check if placement is safe function isSafe(board currRow currCol){ for (let i = 0; i < board.length; i++) { let placedRow = board[i]; let placedCol = i + 1; // Check diagonals if (Math.abs(placedRow - currRow) === Math.abs(placedCol - currCol)) { return false; // Not safe } } return true; // Safe to place } // Recursive utility to solve N-Queens function nQueenUtil(col n board res visited){ // If all queens placed add to res if (col > n) { res.push([...board ]); return; } // Try each row in column for (let row = 1; row <= n; row++) { // If row not used if (!visited[row]) { // Check safety if (isSafe(board row col)) { // Mark row visited[row] = true; // Place queen board.push(row); // Recur for next column nQueenUtil(col + 1 n board res visited); // Backtrack board.pop(); visited[row] = false; } } } } // Main N-Queen solver function nQueen(n){ let res = []; let board = []; let visited = Array(n + 1).fill(false); nQueenUtil(1 n board res visited); return res; } // Driver code let n = 4; let res = nQueen(n); res.forEach(row => console.log(row));
Izvade
[2 4 1 3] [3 1 4 2]
Laika sarežģītība: O(n!*n) n! visu ģenerēšanai permutācijas un O(n) katras permutācijas validācijai.
Palīgtelpa: O(n)
[Paredzamā pieeja] — atkāpšanās izmantošana ar atzarošanu — O(n!) laiks un O(n) telpa
Lai optimizētu iepriekš minēto pieeju, mēs varam izmantot atkāpšanās ar atzarošanu . Tā vietā, lai ģenerētu visas iespējamās permutācijas, mēs pakāpeniski veidojam risinājumu, vienlaikus to darot, mēs varam nodrošināt, ka katrā solī daļējais risinājums paliek spēkā. Ja rodas konflikts, mēs nekavējoties atkāpsimies, un tas palīdzēs izvairoties nevajadzīgi aprēķini .
Soli pa solim ieviešana :
javascript onclick
- Sāciet no pirmās kolonnas un mēģiniet katrā rindā ievietot karalieni.
- Saglabājiet masīvus, lai izsekotu kuriem rindas jau ir aizņemtas. Līdzīgi izsekošanai majors un nelielas diagonāles jau ir aizņemtas.
- Ja karaliene izvietojumu konflikti ar esošajām karalienēm izlaist ka rinda un atkāpties karaliene, lai mēģinātu nākamo iespējams rinda (Apgriezt un atkāpties konflikta laikā).
// C++ program to find all solution of N queen problem by // using backtracking and pruning #include
// Java program to find all solutions of the N-Queens problem // using backtracking and pruning import java.util.ArrayList; import java.util.List; class GfG { // Utility function for solving the N-Queens // problem using backtracking. static void nQueenUtil(int j int n ArrayList<Integer> board boolean[] rows boolean[] diag1 boolean[] diag2 ArrayList<ArrayList<Integer>> res) { if (j > n) { // A solution is found res.add(new ArrayList<>(board)); return; } for (int i = 1; i <= n; ++i) { if (!rows[i] && !diag1[i + j] && !diag2[i - j + n]) { // Place queen rows[i] = diag1[i + j] = diag2[i - j + n] = true; board.add(i); // Recurse to the next column nQueenUtil(j + 1 n board rows diag1 diag2 res); // Remove queen (backtrack) board.remove(board.size() - 1); rows[i] = diag1[i + j] = diag2[i - j + n] = false; } } } // Solves the N-Queens problem and returns // all valid configurations. static ArrayList<ArrayList<Integer>> nQueen(int n) { ArrayList<ArrayList<Integer>> res = new ArrayList<>(); ArrayList<Integer> board = new ArrayList<>(); // Rows occupied boolean[] rows = new boolean[n + 1]; // Major diagonals (row + j) and Minor diagonals (row - col + n) boolean[] diag1 = new boolean[2 * n + 1]; boolean[] diag2 = new boolean[2 * n + 1]; // Start solving from the first column nQueenUtil(1 n board rows diag1 diag2 res); return res; } public static void main(String[] args) { int n = 4; ArrayList<ArrayList<Integer>> res = nQueen(n); for (ArrayList<Integer> solution : res) { System.out.print('['); for (int i = 0; i < solution.size(); i++) { System.out.print(solution.get(i)); if (i != solution.size() - 1) { System.out.print(' '); } } System.out.println(']'); } } }
# Python program to find all solutions of the N-Queens problem # using backtracking and pruning def nQueenUtil(j n board rows diag1 diag2 res): if j > n: # A solution is found res.append(board[:]) return for i in range(1 n + 1): if not rows[i] and not diag1[i + j] and not diag2[i - j + n]: # Place queen rows[i] = diag1[i + j] = diag2[i - j + n] = True board.append(i) # Recurse to the next column nQueenUtil(j + 1 n board rows diag1 diag2 res) # Remove queen (backtrack) board.pop() rows[i] = diag1[i + j] = diag2[i - j + n] = False def nQueen(n): res = [] board = [] # Rows occupied rows = [False] * (n + 1) # Major diagonals (row + j) and Minor diagonals (row - col + n) diag1 = [False] * (2 * n + 1) diag2 = [False] * (2 * n + 1) # Start solving from the first column nQueenUtil(1 n board rows diag1 diag2 res) return res if __name__ == '__main__': n = 4 res = nQueen(n) for temp in res: print(temp)
// C# program to find all solutions of the N-Queens problem // using backtracking and pruning using System; using System.Collections.Generic; class GfG { // Utility function for solving the N-Queens // problem using backtracking. static void nQueenUtil(int j int n List<int> board bool[] rows bool[] diag1 bool[] diag2 List<List<int>> res) { if (j > n) { // A solution is found res.Add(new List<int>(board)); return; } for (int i = 1; i <= n; ++i) { if (!rows[i] && !diag1[i + j] && !diag2[i - j + n]) { // Place queen rows[i] = diag1[i + j] = diag2[i - j + n] = true; board.Add(i); // Recurse to the next column nQueenUtil(j + 1 n board rows diag1 diag2 res); // Remove queen (backtrack) board.RemoveAt(board.Count - 1); rows[i] = diag1[i + j] = diag2[i - j + n] = false; } } } // Solves the N-Queens problem and returns // all valid configurations. static List<List<int>> nQueen(int n) { List<List<int>> res = new List<List<int>>(); List<int> board = new List<int>(); // Rows occupied bool[] rows = new bool[n + 1]; // Major diagonals (row + j) and Minor diagonals (row - col + n) bool[] diag1 = new bool[2 * n + 1]; bool[] diag2 = new bool[2 * n + 1]; // Start solving from the first column nQueenUtil(1 n board rows diag1 diag2 res); return res; } static void Main(string[] args) { int n = 4; List<List<int>> res = nQueen(n); foreach (var temp in res) { Console.WriteLine('[' + String.Join(' ' temp) + ']'); } } }
// JavaScript program to find all solutions of the N-Queens problem // using backtracking and pruning // Utility function for solving the N-Queens // problem using backtracking. function nQueenUtil(j n board rows diag1 diag2 res) { if (j > n) { // A solution is found res.push([...board]); return; } for (let i = 1; i <= n; ++i) { if (!rows[i] && !diag1[i + j] && !diag2[i - j + n]) { // Place queen rows[i] = diag1[i + j] = diag2[i - j + n] = true; board.push(i); // Recurse to the next column nQueenUtil(j + 1 n board rows diag1 diag2 res); // Remove queen (backtrack) board.pop(); rows[i] = diag1[i + j] = diag2[i - j + n] = false; } } } // Solves the N-Queens problem and returns // all valid configurations. function nQueen(n) { const res = []; const board = []; // Rows occupied const rows = Array(n + 1).fill(false); // Major diagonals (row + j) and Minor diagonals (row - col + n) const diag1 = Array(2 * n + 1).fill(false); const diag2 = Array(2 * n + 1).fill(false); // Start solving from the first column nQueenUtil(1 n board rows diag1 diag2 res); return res; } // Driver Code const n = 4; const res = nQueen(n); res.forEach(temp => console.log(temp));
Izvade
[2 4 1 3] [3 1 4 2]
Laika sarežģītība: O(n!) Visu ģenerēšanai permutācijas .
Palīgtelpa: O(n)
jpa vs hibernate
[Alternatīva pieeja] — atkāpšanās, izmantojot bitu maskēšanu
Lai vēl vairāk optimizētu atkāpšanās pieeja, jo īpaši lielākām vērtībām n varam izmantot bitu maskēšana lai efektīvi izsekotu aizņemts rindas un diagonāles. Bitu maskēšana ļauj izmantot veselus skaitļus ( rindas ld rd ), lai izsekotu, kuras rindas un diagonāles ir aizņemtas, izmantojot ātro bitu operācijas ātrākai aprēķinus. Pieeja paliek tāda pati kā iepriekš.
Zemāk ir dota īstenošana:
C++//C++ program to find all solution of N queen problem //using recursion #include
// Java program to find all solution of N queen problem // using recursion import java.util.*; class GfG { // Function to check if the current placement is safe static boolean isSafe(int row int col int rows int ld int rd int n) { return !(((rows >> row) & 1) == 1) && !(((ld >> (row + col)) & 1) == 1) && !(((rd >> (row - col + n)) & 1) == 1); } // Recursive function to generate all possible permutations static void nQueenUtil(int col int n ArrayList<Integer> board ArrayList<ArrayList<Integer>> res int rows int ld int rd) { // If all queens are placed add into res if (col > n) { res.add(new ArrayList<>(board)); return; } // Try placing a queen in each row // of the current column for (int row = 1; row <= n; ++row) { // Check if it's safe to place the queen if (isSafe(row col rows ld rd n)) { // Place the queen board.add(row); // Recur to place the next queen nQueenUtil(col + 1 n board res rows | (1 << row) (ld | (1 << (row + col))) (rd | (1 << (row - col + n)))); // Backtrack: remove the queen board.remove(board.size() - 1); } } } // Main function to find all distinct // res to the n-queens puzzle static ArrayList<ArrayList<Integer>> nQueen(int n) { ArrayList<ArrayList<Integer>> res = new ArrayList<>(); // Current board configuration ArrayList<Integer> board = new ArrayList<>(); // Start solving from the first column nQueenUtil(1 n board res 0 0 0); return res; } public static void main(String[] args) { int n = 4; ArrayList<ArrayList<Integer>> res = nQueen(n); for (ArrayList<Integer> solution : res) { System.out.print('['); for (int j = 0; j < n; ++j) { System.out.print(solution.get(j)); if (j != n - 1) System.out.print(' '); } System.out.println(']'); } } }
# Python program to find all solution of N queen problem # using recursion # Function to check if the current placement is safe def isSafe(row col rows ld rd n): return not ((rows >> row) & 1) and not ((ld >> (row + col)) & 1) and not ((rd >> (row - col + n)) & 1) # Recursive function to generate all possible permutations def nQueenUtil(col n board res rows ld rd): # If all queens are placed add into res if col > n: res.append(board[:]) return # Try placing a queen in each row # of the current column for row in range(1 n + 1): # Check if it's safe to place the queen if isSafe(row col rows ld rd n): # Place the queen board.append(row) # Recur to place the next queen nQueenUtil(col + 1 n board res rows | (1 << row) (ld | (1 << (row + col))) (rd | (1 << (row - col + n)))) # Backtrack: remove the queen board.pop() # Main function to find all distinct # res to the n-queens puzzle def nQueen(n): res = [] # Current board configuration board = [] # Start solving from the first column nQueenUtil(1 n board res 0 0 0) return res if __name__ == '__main__': n = 4 res = nQueen(n) for solution in res: print('[' end='') for j in range(n): print(solution[j] end='') if j != n - 1: print(' ' end='') print(']')
// C# program to find all solution of N queen problem // using recursion using System; using System.Collections.Generic; class GfG { // Function to check if the current placement is safe static bool isSafe(int row int col int rows int ld int rd int n) { return !(((rows >> row) & 1) == 1) && !(((ld >> (row + col)) & 1) == 1) && !(((rd >> (row - col + n)) & 1) == 1); } // Recursive function to generate all possible permutations static void nQueenUtil(int col int n List<int> board List<List<int>> res int rows int ld int rd) { // If all queens are placed add into res if (col > n) { res.Add(new List<int>(board)); return; } // Try placing a queen in each row // of the current column for (int row = 1; row <= n; ++row) { // Check if it's safe to place the queen if (isSafe(row col rows ld rd n)) { // Place the queen board.Add(row); // Recur to place the next queen nQueenUtil(col + 1 n board res rows | (1 << row) (ld | (1 << (row + col))) (rd | (1 << (row - col + n)))); // Backtrack: remove the queen board.RemoveAt(board.Count - 1); } } } // Main function to find all distinct // res to the n-queens puzzle static List<List<int>> nQueen(int n) { List<List<int>> res = new List<List<int>>(); // Current board configuration List<int> board = new List<int>(); // Start solving from the first column nQueenUtil(1 n board res 0 0 0); return res; } static void Main() { int n = 4; List<List<int>> res = nQueen(n); foreach (var solution in res) { Console.Write('['); for (int j = 0; j < n; ++j) { Console.Write(solution[j]); if (j != n - 1) Console.Write(' '); } Console.WriteLine(']'); } } }
// JavaScript program to find all solution of N queen problem // using recursion // Function to check if the current placement is safe function isSafe(row col rows ld rd n) { return !((rows >> row) & 1) && !((ld >> (row + col)) & 1) && !((rd >> (row - col + n)) & 1); } // Recursive function to generate all possible permutations function nQueenUtil(col n board res rows ld rd) { // If all queens are placed add into res if (col > n) { res.push([...board]); return; } // Try placing a queen in each row // of the current column for (let row = 1; row <= n; ++row) { // Check if it's safe to place the queen if (isSafe(row col rows ld rd n)) { // Place the queen board.push(row); // Recur to place the next queen nQueenUtil(col + 1 n board res rows | (1 << row) (ld | (1 << (row + col))) (rd | (1 << (row - col + n)))); // Backtrack: remove the queen board.pop(); } } } // Main function to find all distinct // res to the n-queens puzzle function nQueen(n) { let res = []; // Current board configuration let board = []; // Start solving from the first column nQueenUtil(1 n board res 0 0 0); return res; } // Driver Code let n = 4; let res = nQueen(n); for (let i = 0; i < res.length; i++) { process.stdout.write('['); for (let j = 0; j < n; ++j) { process.stdout.write(res[i][j].toString()); if (j !== n - 1) process.stdout.write(' '); } console.log(']'); }
Izvade
[2 4 1 3] [3 1 4 2]
Laika sarežģītība: O(n!) visu permutāciju ģenerēšanai.
Kosmosa sarežģītība: O(n)