A sequence of numbers is called a wiggle sequence if the differences between successive numbers strictly alternate between positive and negative. The first difference (if one exists) may be either positive or negative. A sequence with fewer than two elements is trivially a wiggle sequence.
For example, [1,7,4,9,2,5] is a wiggle sequence because the differences (6,-3,5,-7,3) are alternately positive and negative. In contrast, [1,4,7,2,5] and [1,7,4,5,5] are not wiggle sequences, the first because its first two differences are positive and the second because its last difference is zero.
Given a sequence of integers, return the length of the longest subsequence that is a wiggle sequence. A subsequence is obtained by deleting some number of elements (eventually, also zero) from the original sequence, leaving the remaining elements in their original order.
Examples:
Input: [1,7,4,9,2,5] Output: 6 The entire sequence is a wiggle sequence. Input: [1,17,5,10,13,15,10,5,16,8] Output: 7 There are several subsequences that achieve this length. One is [1,17,10,13,10,16,8]. Input: [1,2,3,4,5,6,7,8,9] Output: 2
Follow up:
Can you do it in O(n) time?
思路:
用两个dp数组来维护状态的更新。
up[i]表示到i为止最后一个字符是上升的子序列长度。down[i]表示到i为止最后一个字符是下降的子序列长度。
由于摆动序列要求上升与下降交替进行。
故状态转移方程为
up[i] = max(up[i], down[j] + 1);
down[i] = max(down[i], up[j] + 1);
int wiggleMaxLength(vector<int>& nums) { int n = nums.size(),maxup=0,maxdown =0; vector<int>up(n + 1,0); vector<int>down(n + 1, 0); for (int i = 0; i <n;i++) { up[i] = 1; down[i] = 1; for (int j = 0; j < i;j++) { if (nums[i]>nums[j]) { up[i] = max(up[i], down[j] + 1); } if (nums[i]<nums[j]) { down[i] = max(down[i], up[j] + 1); } } // maxup = max(maxup, up[i]); // maxdown = max(maxdown, down[i]); } return max(up.back(), down.back()); }
另外此题时间复杂度为O(n)的做法,暂时还没搞明白。。。