COCI '15 Contest 4 #5 Galaksija

Points: 15 (partial)

Time limit: 0.6s

Memory limit: 64M

Problem types

A long time ago in a galaxy far, far away, there were $N$ ~N~ planets. There were also $N-1$ ~N-1~ interplanetary paths that connected all the planets (directly or indirectly). In other words, the network of planets and paths formed a tree. Additionally, each path was enumerated with an integer that denoted the curiosity of the path.

A pair of planets $A, B$ ~A, B~ is boring if the following holds:

$A$ ~A~ and $B$ ~B~ are different planets
travelling between planet $A$ ~A~ and $B$ ~B~ is possible using one or more interplanetary paths
binary XOR of the curiosity of all the paths in that travel is equal to 0

Alas, the times have changed and an evil emperor is ruling the galaxy. He decided to use the Force to destroy all the interplanetary paths in a certain order.

Determine the number of boring pairs of planets before the emperor started the destruction and after each destruction.

Input

The first line of input contains the integer $N$ ~N~ $(1 \le N \le 100\,000)$ ~(1 \le N \le 100\,000)~.

Each of the following $N-1$ ~N-1~ line contains three integers $A_i$ ~A_i~, $B_i$ ~B_i~, $Z_i$ ~Z_i~ $(1 \le A_i, B_i \le N, 0 \le Z_i \le 1\,000\,000\,000)$ that denote that planets $A_i$ ~A_i~ and $B_i$ ~B_i~ are directly connected with a path of curiosity $Z_i$ ~Z_i~.

The following line of input contains the permutation of the first $N-1$ ~N-1~ integers that denote the order in which the emperor is destroying the paths. If the $i^{th}$ ~i^{th}~ element of the permutation is $j$ ~j~, then the emperor destroyed the path between planets $A_j$ ~A_j~ and $B_j$ ~B_j~ in the $i^{th}$ ~i^{th}~ step.

Output

The output must contain $N$ ~N~ lines, the $k^{th}$ ~k^{th}~ line containing the number of boring pairs $A, B$ ~A, B~ from the task after the emperor destroyed exactly $k-1$ ~k-1~ paths.

Scoring

In test cases worth 20% of total points, it will hold $N \le 1\,000$ ~N \le 1\,000~.

In test cases worth at least 30% of total points, every path's curiosity will be equal to 0.

Sample Input 1

2
1 2 0
1

Sample Output 1

1
0

Explanation for Sample Output 1

Before the destruction, the path between planets 1 and 2 is boring. After destruction, the path between them doesn't exist anymore.

Sample Input 2

Sample Output 2

1
0
0

Explanation for Sample Output 2

Before the destruction, pair of planets $(1, 3)$ ~(1, 3)~ is boring. Travel between 1 and 3 is no longer possible after the first and after the second destruction, and none of the remaining pairs of planets is boring.

Sample Input 3

Sample Output 3

Explanation for Sample Output 3

Notice that in this example each pair of planets with a possible path between them is boring because all paths have the curiosity 0.

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