这是一个关于LeetCode 390题目的解析,题目要求从1到n的有序整数列表中,交替从左右开始删除每隔一个的元素,直至只剩下一个数。最后输出剩余的数字。该问题可以视为约瑟夫环问题的变种,解决思路是找到递推关系,即每次删除后剩余结果为前一次结果的镜像翻倍。
Elimination Game
Medium
There is a list of sorted integers from 1 to n. Starting from left to right, remove the first number and every other number afterward until you reach the end of the list.
Repeat the previous step again, but this time from right to left, remove the right most number and every other number from the remaining numbers.
We keep repeating the steps again, alternating left to right and right to left, until a single number remains.
Find the last number that remains starting with a list of length n.
Example:
Input:
n = 9,
1 2 3 4 5 6 7 8 9
2 4 6 8
2 6
6
Output:
6
题意
蛇形(从左往右然后从右往左)删去[1, n]中奇数位置的数,求最后剩下的数
思路
约瑟夫环问题的变种,更加简单。思路也是寻找递推式。
注意到本题每次消去${当前数组长度}/2的数,相邻两次消去方向相反,因此后一次消去的结果是前一次消去的结果的镜像再乘以2. 递推式:
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