# Maximum sum in a rank-ordered list

I know it's not a programming question but it involves programming and some math. Say I have a set of N items, all have their points, and ordered by their ranks. For example:

``````list1 = { // N = 4
1: (item1, points: 100, rank:1),
2: (item2, points:55, rank:2),
3: (item3, points:55, rank:2),
4: (item4, points:45, rank:3) }
``````

and so on. list2 is another list of these 4 (N) items, but with different points, thus different ranks. I'm trying to do a comparison for these two lists, like the sum of the differences of item ranks in two lists.

For example:

``````list2 = { // N = 4
1: (item4, points: 10, rank:1),
2: (item3, points:9, rank:2),
3: (item2, points:8, rank:3),
4: (item1, points:7, rank:4) }
``````

in this case the sum of differences S = (item1 rank difference + item2 " " + ....) S= 3 + 1 + 0 + 2 = 6

in order to compare it with the worst case, I need this sum's worst value for different N's.

so, what is the maximum value of S in terms of N? S_max (N) =?

Thanks for any help.

-

``````sum = (1-1)+(2-1)+...+((n-1)-1)+(n-1)