The sliding window approach allows us to efficiently find subarrays where the product is less than k. By maintaining a window (two pointers), we can dynamically adjust the size of the current subarray based on the product of its elements. As the window size grows, the product is updated; if it exceeds k, we reduce the window from the left until the product is again less than k. This method minimizes redundant calculations.
Time Complexity: O(n) - Each element is processed at most twice.
Space Complexity: O(1) - Only a constant amount of extra space is used.
1#include <stdio.h>
2
3int numSubarrayProductLessThanK(int* nums, int numsSize, int k) {
4 if (k <= 1) return 0;
5 int prod = 1, count = 0, left = 0;
6 for (int right = 0; right < numsSize; right++) {
7 prod *= nums[right];
8 while (prod >= k) prod /= nums[left++];
9 count += right - left + 1;
10 }
11 return count;
12}The solution leverages a sliding window (or two-pointer) technique. The product of elements within the window is maintained, and pointers left and right are used to denote the current subarray. If the product exceeds k, the left pointer is moved to shrink the window until the product is less than k. The count of subarrays ending at each index is added to the total count.
The brute force approach involves checking every possible subarray within nums and calculating their products. Each subarray is counted if its product is less than k. Though less efficient, it guarantees correctness by examining all potential subarrays.
Time Complexity: O(n^2) - Considers all possible subarrays.
Space Complexity: O(1) - Constant extra space used.
1#include <stdio.h>
2
3int numSubarrayProductLessThanK_bruteforce(int* nums, int numsSize, int k) {
4 if (k <= 1) return 0;
5 int count = 0;
6 for (int start = 0; start < numsSize; start++) {
7 int prod = 1;
8 for (int end = start; end < numsSize; end++) {
9 prod *= nums[end];
10 if (prod >= k) break;
11 count++;
12 }
13 }
14 return count;
15}This C function explores all subarrays starting from each index and computes their products. It stops extending a subarray when its product reaches or exceeds k, thereby optimizing to some degree compared to recalculating products from scratch for each subarray.