1.Haskell
safe :: Int -> [Int] -> Int -> Bool safe _ [] _ = True safe x (x1:xs) n = x /= x1 && x /= x1 + n && x /= x1 - n && safe x xs (n+1) queenN :: Int -> [[Int]] queenN 0 = [[]] queenN n = [x : y | y <- queenN(n-1) , x <- [1..8],safe x y 1]
safe 判断和自己n行前的那个有没有冲突,x1 + 1,x1 - 1表示右上角和左上角
2. python
class Solution: def solveNQueens(self, n: int) -> List[List[int]]: c = [False] * n l1 = [False] * (2 * n) l2 = [False] * (2 * n) ans = [] l = [] def is_attacted(i: int, j: int) -> bool: # 对角线 j-i+n 相同为同一对角线,j+i相同为同一副对角线 return True if c[j] or l1[j - i + n] or l2[j + i] else False def add_queen(i, j): c[j] = not c[j] l1[j - i + n] = not l1[j - i + n] l2[j + i] = not l2[j + i] def remove_queen(i, j): add_queen(i,j) def bt (i): if i == n : ans.append(l.copy()) for x in range(n): if not is_attacted(i,x): l.append(x) add_queen(i,x) bt(i+1) remove_queen(i,x) l.pop() bt(0) return ans s = Solution() print(s.solveNQueens(4))