此题是Search in Rotated Sorted Array的加强版,将一个有序数组往右移动若干位。这里的有序数组允许有重复数字。
如果没有重复数字,那么复杂度是O(logn),用二分查找,根据中间值和左右两边的大小,以及和target的大小,来判断缩小一半查找。
但是出现重复数字之后,如果中间值和左右两边的值相等,我们就不知道如何切除一半了,这时候就只能将边界缩小,也就是左边界加一,或者右边界减一。但是这个复杂度就是O(n)了
class Solution { public: bool search(int A[], int n, int target) { if (n == 0) return false; int left = 0, right = n-1; while(left <= right) { int mid = (left + right)/2; if (A[mid] == target || A[left] == target || A[right] == target) return true; if (A[mid] > A[left]) { if (A[mid] > target && A[left] < target) { right = mid - 1; } else { left = mid + 1; } } else if (A[mid] < A[left]) { if (A[mid] < target && A[right] > target) { left = mid + 1; } else { right = mid - 1; } } else left++; } return false; } };
我在做的过程中还想到要判断的一个是,当左边等于中间,但是中间不等于右边的时候,那么可以缩短一半,同理,如果右边的等于中间,但是左边的不等于中间的时候也可以缩短一半。只有当左右两边和中间都相等的时候才不知道如何判断。右边减一或者左边加一。
class Solution { public: bool search(int A[], int n, int target) { if (n == 0) return false; int left = 0, right = n-1; while(left <= right) { int mid = (left + right)/2; if (A[mid] == target || A[left] == target || A[right] == target) return true; if (A[mid] == A[left] && A[mid] == A[right]) {right--; continue;} if (A[mid] == A[left]) { left = mid + 1;} if (A[mid] == A[right]) { right = mid - 1;} if (A[mid] > A[left]) { if (A[mid] > target && A[left] < target) { right = mid - 1; } else { left = mid + 1; } } else { if (A[mid] < target && A[right] > target) { left = mid + 1; } else { right = mid - 1; } } } return false; } };
2015/03/29:
Python:
class Solution: # @param A a list of integers # @param target an integer # @return a boolean def search(self, A, target): left, right = 0, len(A)-1 while left <= right: mid = (left + right) / 2 if A[mid] == target: return True if A[mid] < A[right]: if A[mid] < target and target <= A[right]: left = mid + 1 else: right = mid -1 elif A[mid] > A[right]: if A[mid] > target and target >= A[left]: right = mid - 1 else: left = mid + 1 else: right -= 1 return False