D. Valid Sets
time limit per test
1 second
memory limit per test
256 megabytes
input
standard input
output
standard output
As you know, an undirected connected graph with n nodes and n?-?1 edges is called a tree. You are given an integer d and a tree consisting of n nodes. Each node i has a value ai associated with it.
We call a set S of tree nodes valid if following conditions are satisfied:
Your task is to count the number of valid sets. Since the result can be very large, you must print its remainder modulo 1000000007(109?+?7).
Input
The first line contains two space-separated integers d (0?≤?d?≤?2000) and n (1?≤?n?≤?2000).
The second line contains n space-separated positive integers a1,?a2,?...,?an(1?≤?ai?≤?2000).
Then the next n?-?1 line each contain pair of integers u and v (1?≤?u,?v?≤?n) denoting that there is an edge between u and v. It is guaranteed that these edges form a tree.
Output
Print the number of valid sets modulo 1000000007.
Sample test(s)
input
1 42 1 3 21 21 33 4
output
input
0 31 2 31 22 3
output
input
4 87 8 7 5 4 6 4 101 61 25 81 33 56 73 4
output
41
Note
In the first sample, there are exactly 8 valid sets: {1},?{2},?{3},?{4},?{1,?2},?{1,?3},?{3,?4} and {1,?3,?4}. Set {1,?2,?3,?4} is not valid, because the third condition isn't satisfied. Set {1,?4} satisfies the third condition, but conflicts with the second condition.
题意:RT
思路:树形DP,dp[u]表示以u为根,且它的所有子树的点v的权值都不超过它,且满足 w[u]-w[v]
对于每个点为根这样算一遍就好了,注意减去算重的情况,即相邻多个点的权值相等,可以用点的代号去重(即规定只能从代号大的往小的DP)