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59 lines
2.2 KiB
Markdown
59 lines
2.2 KiB
Markdown
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# [390. Elimination Game](https://leetcode.com/problems/elimination-game/)
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# 思路
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给定1,2,...,n,然后按照题目的规则不断删除一些数,求最后剩下的数。
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## 思路一
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我首先想到的就是按照题目的规则进行模拟,但不要纯暴力模拟,那样肯定超时,还是要根据其中一些规律。
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有一个很容易发现的规律:每次剩下的数都是一个等差数列,而且等差分别为1、2、4...。
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为此我们可以用一个循环,每次记录剩下的数的第一个数start和最后一个数end以及等差diff,不断循环直到 start = end 。
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## 思路二
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逛[评论区](https://leetcode.com/problems/elimination-game/discuss/87128/C-1-line-solution-with-explanation)还发现了一个代码很简洁的递归解法。
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我们设
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* `ML(n)`代表第一次是从左往后的情况下最终剩下的数,这就是要我们写的函数;
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* `MR(n)`代表第一次是从右往左的情况下最终剩下的数;
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注意我们第一次将所有奇数都删除了,将剩下所有偶数都除2就得到序列1,2,...,n/2。即我们有`ML(n) = 2 * MR(n/2)`。
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又因为我们有`ML(n) + MR(n) = n + 1`(证明见[讨论区](https://leetcode.com/problems/elimination-game/discuss/87128/C-1-line-solution-with-explanation)),
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所以`ML(n) = 2 * (n/2 + 1 - ML(n/2))`。根据这个公式我们就可以写出递归函数了,就一行。
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# C++
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## 思路一
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``` C++
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class Solution {
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public:
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int lastRemaining(int n) {
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int start = 1, end = n, diff = 1;
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int i = 0; // i记录循环的次数
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while(start != end){
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if(!(i & 1)){ // 从前往后, start可直接写出
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start += diff;
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diff <<= 1;
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end = (end - start) / diff * diff + start;
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}
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else{ // 从后往前, end可直接写出
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end -= diff;
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diff <<= 1;
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start = end - (end - start) / diff * diff;
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}
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i++;
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}
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return start;
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}
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};
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```
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## 思路二
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``` C++
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class Solution {
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public:
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int lastRemaining(int n) {
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return n == 1 ? 1 : 2 * (1 + n / 2 - lastRemaining(n / 2));
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}
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};
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```
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