Array - 376. Wiggle Subsequence
376. Wiggle Subsequence
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.
Example 1:
Input: [1,7,4,9,2,5]
Output: 6
Explanation: The entire sequence is a wiggle sequence.
Example 2:
Input: [1,17,5,10,13,15,10,5,16,8]
Output: 7 Explanation: There are several subsequences that achieve this length. One is [1,17,10,13,10,16,8].
Example 3:
Input: [1,2,3,4,5,6,7,8,9]
Output: 2
Follow up:
Can you do it in O(n) time?
思路:
摇摆数组的最大值这题是很经典的动态规划,状态转移方程有两个,保存的分别是当前位置之前上凸下凹两种极点的个数,这样来找出最大的摇摆数组长度。
代码:
java:
class Solution {
public int wiggleMaxLength(int[] nums) {
if (nums == null || nums.length == 0) return 0;
int len = nums.length;
int[] down = new int[len]; // num down
int[] up = new int[len];
// 初始条件
down[0] = 1;
up[0] = 1;
for (int i = 1; i < len; i++) {
if (nums[i] < nums[i-1]) {
down[i] = up[i-1] + 1;
up[i] = up[i-1];
} else if (nums[i] > nums[i-1]) {
up[i] = down[i-1] + 1;
down[i] = down[i-1];
} else {
// 两数相等
up[i] = up[i-1];
down[i] = down[i-1];
}
}
return Math.max(up[len - 1], down[len - 1]);
}
}