""" 60. Permutation Sequence Medium 621 170 Favorite Share The set [1,2,3,...,n] contains a total of n! unique permutations. By listing and labeling all of the permutations in order, we get the following sequence for n = 3: "123" "132" "213" "231" "312" "321" Given n and k, return the kth permutation sequence. Note: Given n will be between 1 and 9 inclusive. Given k will be between 1 and n! inclusive. Example 1: Input: n = 3, k = 3 Output: "213" Example 2: Input: n = 4, k = 9 Output: "2314" """
n个互不相同的自然数,分别是1,2,3...n,组合成数字的集合,有n!中可能,按照从小到大的顺序依次排列并编号为1,2,3,...n!,
给定一个n和序列号k(1<=k<=n!)请求第k个数字的字符串
想到的方法:
1,有办法求得数字组合的下一个,这样求k次,算法复杂度大约是knlgn(我也不确定,算出来大约是k(lg1+lg2+...+lgn)),也就是(n^2)lgn
2,可以观察根据第一个数字均匀分为了n种,总可能是n!种,因此可以将k-1和(n-1)!的商来确定首字母,根据余来确定剩下数字的排列可能性中的位置,这样算法复杂度就是o(n!)
下面是我的代码
class Solution: def getPermutation(self, n, k): """ :type n: int :type k: int :rtype: str """ if not n: return "" result = "" nums = [i for i in range(1, n+1)] numsfactorial = [1] for i in range(1, n): numsfactorial.append(numsfactorial[-1]*i) for i in range(n, 0, -1): j = (k-1)//numsfactorial[i-1] k = (k-1)%numsfactorial[i-1] + 1 result += str(nums[j]) del nums[j] return result