Given N arrays with sizeof N, and they are all sorted, if it does not allow you to use extra space, how will find their common datas efficiently or with less time complexity?
1. 10 160 200 500 500 2. 4 150 160 170 500 3. 2 160 200 202 203 4. 3 150 155 160 300 5. 3 150 155 160 301
This is an interview question, I found some questions which were similar but they didn't include the extra conditions of input being sorted or not being able to use extra memory.
I couldn't think of any solution less than O(n^2 lg n) complexity. In that case, I'd prefer to go with the simplest solution which gives me this complexity, which is:
not_found_flag = false for each element 'v' in row-1 for each row 'i' in the remaining set perform binary search for 'v' in 'i' if 'v' not found in row 'i' not_found_flag = true break if not not_found_flag print element 'v' as it is one of the common element
We could improve this by comparing the min and max of each row and decide based on that whether it is possible for a number 'num' to fall between 'min_num' and 'max_num' of that row.
Binary search -> O(log n) For searching 1 num in n-1 rows : O(nlogn) Binary search for each number in first row : O(n2logn)
I selected first row, we can pick any row and if a no element of the row picked is found in any of the (N-1) rows then we don't really have common data.