Given an array nums and a target value k, find the maximum length of a subarray that sums to k. If there isn't one, return 0 instead.
Note:
The sum of the entire nums array is guaranteed to fit within the 32-bit signed integer range.
Example 1:
Given nums = [1, -1, 5, -2, 3], k = 3,
return 4. (because the subarray [1, -1, 5, -2] sums to 3 and is the longest)
Example 2:
Given nums = [-2, -1, 2, 1], k = 1,
return 2. (because the subarray [-1, 2] sums to 1 and is the longest)
Follow Up:
Can you do it in O(n) time?
一刷
题解:我们把所有从0到i的sum存到map中,map.put(sum, i+1), 并且如果有重复的sum, 不更新,保证map中的value最小。
这样的话,如果当前的sum!=k, 但是sum-k在map中,表示有一段subarray可以等于k, 于是max = Math.max(max, i+1-map.get(sum-k));
, 这就是map不更新,保证map保存最短的subarray
class Solution {
public int maxSubArrayLen(int[] nums, int k) {
int sum = 0, max = 0;
Map map = new HashMap<>();
for(int i=0; i