Given an integer array nums, return the number of range sums that lie in [lower, upper] inclusive.
Range sum S(i, j) is defined as the sum of the elements in numsbetween indices i and j (i ≤ j), inclusive.
Note:
A naive algorithm of O(n2) is trivial. You MUST do better than that.
Example:
Input: nums =[-2,5,-1], lower =-2, upper =2, Output: 3 Explanation: The three ranges are :[0,0],[2,2],[0,2]and their respective sums are:-2, -1, 2.
给定一个整数数组 nums,返回区间和在 [lower, upper] 之间的个数,包含 lower 和 upper。
区间和 S(i, j) 表示在 nums 中,位置从 i 到 j 的元素之和,包含 i 和 j (i ≤ j)。
说明:
最直观的算法复杂度是 O(n2) ,请在此基础上优化你的算法。
示例:
输入: nums =[-2,5,-1], lower =-2, upper =2, 输出: 3 解释: 3个区间分别是:[0,0],[2,2],[0,2],它们表示的和分别为:-2, -1, 2。
140 ms
1 class Solution { 2 func countRangeSum(_ nums: [Int], _ lower: Int, _ upper: Int) -> Int { 3 let count = nums.count 4 if count == 0 { 5 return 0 6 } 7 var sums = Array(repeating: 0, count: count+1) 8 9 for i in 1..<count+1 { 10 sums[i] = sums[i-1] + nums[i-1] 11 } 12 13 let maxSum = sums.max()! 14 15 func mergeSort(_ low : Int, _ high : Int) -> Int { 16 if low == high { 17 return 0 18 } 19 let mid = (low + high) >> 1 20 var res = mergeSort(low, mid) + mergeSort(mid+1, high) 21 var x = low, y = low 22 for i in mid+1..<high+1 { 23 while x <= mid && sums[i] - sums[x] >= lower { 24 x += 1 25 } 26 while y<=mid && sums[i] - sums[y] > upper { 27 y += 1 28 } 29 res += (x-y) 30 } 31 32 let sli = Array(sums[low..<high+1]) 33 34 var l = low, h = mid + 1 35 36 for i in low..<high+1 { 37 x = l <= mid ? sli[l - low] : maxSum 38 y = h <= high ? sli[h - low] : maxSum 39 40 if x < y { 41 l += 1 42 }else { 43 h += 1 44 } 45 sums[i] = min(x,y) 46 } 47 48 return res 49 } 50 51 return mergeSort(0, count) 52 } 53 }