Here is the problem i am trying to solve,
You are given a table with 2 rows and N columns. Each cell has an integer in it. The score of such a table is denfined as follows: for each column, consider the sum of the two numbers in the column; the maximum of the N numbers so obtained is the score. For example, for the table
7 1 6 2
1 2 3 4the score is max(7 + 1; 1 + 2; 6 + 3; 2 + 4) = 9. The first row of the table is fixed, and given as input. N possible ways to ll the second row are considered:
1; 2; : : : ; N
2; 3; : : : ; N; 1
3; 4; : : : ; N; 1; 2

N; 1; : : : ; ; N 1For instance, for the example above, we would consider each of the following as possibilities for the second row.
1 2 3 4
2 3 4 1
3 4 1 2
4 1 2 3Your task is to find the score for each of the above choices of the second row. In the example above, you would evaluate the following four tables,
7 1 6 2
1 2 3 4
7 1 6 2
2 3 4 1
7 1 6 2
3 4 1 2
7 1 6 2
4 1 2 3
and compute scores 9, 10, 10 and 11, respectivelyTest data: N <= 200000
Time Limit: 2 seconds
Here is the obvious method:
Maintain two arrays A,B, Do the following n times
 add every element A[i] to B[i] and keep a variable max which stores the maximum value so far.
 print max
 loop through array B[i] and increment all the elements by 1, if any element is equal to N, set it equal to 1.
This method will have take O(n^2) time, the outer loop runs N times and there are two inner loops which run for N times each.
To reduce the time taken, we can find the maximum element M in the first row(in a linear scan), and then remove A[i] and B[i] whenever A[i] + N <= M + 1.
Because they will never be max.
But this method might perform better in the average case, the worst case time will still be O(N^2).
To find max in constant time i also considered using a heap, each element of the heap has two attributes, their original value and the value to be added.
But still it will require a linear time to increment the valuetobeadded for all the elements of the heap for each of the n cases.
And so the time still remains O(N^2)
I am not able to find a method that will solve this problem faster than N^2 time which will be too slow as the value of N can be very large.
Any help would be greatly appreciated.