Score : 1000 points
Snuke received N intervals as a birthday present. The i-th interval was [-L_i, R_i]. It is guaranteed that both L_i and R_i are positive. In other words, the origin is strictly inside each interval.
Snuke doesn't like overlapping intervals, so he decided to move some intervals. For any positive integer d, if he pays d dollars, he can choose one of the intervals and move it by the distance of d. That is, if the chosen segment is [a, b], he can change it to either [a+d, b+d] or [a-d, b-d].
He can repeat this type of operation arbitrary number of times. After the operations, the intervals must be pairwise disjoint (however, they may touch at a point). Formally, for any two intervals, the length of the intersection must be zero.
Compute the minimum cost required to achieve his goal.
The input is given from Standard Input in the following format:
N L_1 R_1 : L_N R_N
Print the minimum cost required to achieve his goal.
4 2 7 2 5 4 1 7 5
22
One optimal solution is as follows:
The total cost is 8 + 1 + 2 + 11 = 22 dollars.
20 97 2 75 25 82 84 17 56 32 2 28 37 57 39 18 11 79 6 40 68 68 16 40 63 93 49 91 10 55 68 31 80 57 18 34 28 76 55 21 80
7337