class Solution { private: int getDirection(int A[], int idx, int target, bool isDefaultBack) { int r = A[idx] - target; if (r == 0) { r = isDefaultBack ? -1 : 1; } return r; } int getFirstValueIndex(int A[], int n, int target, bool isFromBack) { int p = -1; int q = n; while (p + 1 < q) { int mid_idx = (p + q) / 2; int where = getDirection(A, mid_idx, target, isFromBack); if (where < 0) { p = mid_idx; } else { q = mid_idx; } } if (p != -1 && A[p] != target) { p = -1; } if (q == n || A[q] != target) { q = -1; } return isFromBack ? p : q; } public: vector<int> searchRange(int A[], int n, int target) { vector<int> res; res.push_back(getFirstValueIndex(A, n, target, false)); res.push_back(getFirstValueIndex(A, n, target, true)); return res; } };
进行两次二分查找,一次找upper bound一次找lower bound,如果线性查找的化就不符合要求了。
第二轮:
Given a sorted array of integers, find the starting and ending position of a given target value.
Your algorithm's runtime complexity must be in the order of O(log n).
If the target is not found in the array, return [-1, -1].
For example,
Given [5, 7, 7, 8, 8, 10] and target value 8,
return [3, 4].
1 class Solution { 2 public: 3 vector<int> searchRange(int A[], int n, int target) { 4 vector<int> res(2, -1); 5 if (A == NULL || n < 1 || target < A[0] || target > A[n-1]) { 6 return res; 7 } 8 9 int lo = 0, hi = n-1; 10 11 int st = lower_bound(A, A + n, target) - A; 12 if (st >= n || A[st] != target) { 13 return res; 14 } 15 int ed = upper_bound(A, A + n, target) - A; 16 res[0] = st; 17 res[1] = ed-1; 18 return res; 19 } 20 };
如果自己写lower_bound和upper_bound的话:
1 class Solution { 2 public: 3 vector<int> searchRange(int A[], int n, int target) { 4 vector<int> res(2, -1); 5 if (A == NULL || n < 1 || target < A[0] || target > A[n-1]) { 6 return res; 7 } 8 9 int lo = 0, hi = n; 10 // lower_bound 11 while (lo < hi) { 12 int mid = (lo + hi) / 2; 13 if (A[mid] < target) { 14 lo = mid + 1; 15 } else { 16 hi = mid; 17 } 18 } 19 20 if (A[lo] != target) { 21 return res; 22 } 23 res[0] = lo; 24 25 lo = 0, hi = n; 26 // upper_bound 27 while (lo < hi) { 28 int mid = (lo + hi) / 2; 29 if (A[mid] <= target) { 30 lo = mid + 1; 31 } else { 32 hi = mid; 33 } 34 } 35 res[1] = lo - 1; 36 37 return res; 38 } 39 };