1311_F. Moving Points
Problem Description
There are n points on a coordinate axis OX. The i-th point is located at the integer point x_i and has a speed v_i. It is guaranteed that no two points occupy the same coordinate. All n points move with the constant speed, the coordinate of the i-th point at the moment t (t can be non-integer) is calculated as x_i + t ⋅ v_i.
Consider two points i and j. Let d(i, j) be the minimum possible distance between these two points over any possible moments of time (even non-integer). It means that if two points i and j coincide at some moment, the value d(i, j) will be 0.
Your task is to calculate the value ∑_{1 ≤ i < j ≤ n} d(i, j) (the sum of minimum distances over all pairs of points).
Input
The first line of the input contains one integer n (2 ≤ n ≤ 2 ⋅ 10^5) — the number of points.
The second line of the input contains n integers x_1, x_2, ..., x_n (1 ≤ x_i ≤ 10^8), where x_i is the initial coordinate of the i-th point. It is guaranteed that all x_i are distinct.
The third line of the input contains n integers v_1, v_2, ..., v_n (-10^8 ≤ v_i ≤ 10^8), where v_i is the speed of the i-th point.
Output
Print one integer — the value ∑_{1 ≤ i < j ≤ n} d(i, j) (the sum of minimum distances over all pairs of points).
Examples
Input
3 1 3 2 -100 2 3
Output
3
Input
5 2 1 4 3 5 2 2 2 3 4
Output
19
Input
2 2 1 -3 0
Output
0
Contest Information
- Contest ID: 1311
- Problem Index: F
- Points: 0.0
- Rating: 1900
- Tags: data structures, divide and conquer, implementation, sortings
- Time Limit: {'seconds': 2, 'nanos': 0} seconds
- Memory Limit: 256000000 bytes
Task
Solve this competitive programming problem. Provide a complete solution that handles all the given constraints and edge cases.