Problem Statement

You are given a simple connected undirected graph with N vertices and M edges, where vertices are numbered 1 to N and edges are numbered 1 to M. Edge i (1 \leq i \leq M) connects vertices u_i and v_i bidirectionally and has weight w_i.

For a path, define its weight as the maximum weight of an edge in the path. Define f(x, y) as the minimum possible path weight of a path from vertex x to vertex y.

You are given two sequences of length K: (A_1, A_2, \ldots, A_K) and (B_1, B_2, \ldots, B_K). It is guaranteed that A_i \neq B_j (1 \leq i,j \leq K).

Permute the sequence B freely so that \displaystyle \sum_{i=1}^{K} f(A_i, B_i) is minimized.

Constraints

• 2 \leq N \leq 2 \times 10^5
• N-1 \leq M \leq \min(\frac{N \times (N-1)}{2},2 \times 10^5)
• 1 \leq K \leq N
• 1 \leq u_i<v_i \leq N (1 \leq i \leq M)
• 1 \leq w_i \leq 10^9
• 1 \leq A_i,B_i \leq N (1 \leq i \leq K)
• The given graph is simple and connected.
• All input values are integers.

Sample Input 1

4 4 3
1 3 2
3 4 1
2 4 5
1 4 4
1 1 3
4 4 2

Sample Output 1

8

If we rearrange B as (2,4,4):

• f(1,2) = 5: The path from vertex 1 to vertex 2 passing through vertex 4 contains edge 3 with a maximum edge weight of 5. There is no path with a maximum edge weight less than or equal to 4, so 5 is the minimum possible.
• f(1,4) = 2: The path from vertex 1 to vertex 4 passing through vertex 3 contains edge 1 with a maximum edge weight of 2. There is no path with a maximum edge weight less than or equal to 1, so 2 is the minimum possible.
• f(3,4) = 1: The path from vertex 3 to vertex 4 passing through the direct edge contains an edge with a maximum edge weight of 1. No path can have a maximum weight 0 or less, so 1 is the minimum possible.

Thus, \displaystyle \sum_{i=1}^{3} f(A_i, B_i) = 5+2+1=8. No permutation of B yields 7 or less, so the answer is 8.

Sample Input 2

3 3 2
1 2 5
2 3 2
1 3 1
1 1
2 3

Sample Output 2

3