The only survival
Time Limit: 40000/20000 MS (Java/Others) Memory Limit: 131072/131072 K (Java/Others)
Total Submission(s): 255 Accepted Submission(s): 120
Problem Description
There is an old country and the king fell in love with a devil. The devil always ask the king to do some crazy things. Although the king used to be wise and beloved by his people. Now he is just like a boy in love and can’t refuse any request from the devil. Also, this devil is looking like a very cute Loli.
Something bad actually happen. The devil makes this kingdom's people infected by a disease called lolicon. Lolicon will take away people's life in silence.
Although z*p is died, his friend, y*wan is not a lolicon. Y*wan is the only one in the country who is immune of lolicon, because he like the adult one so much.
As this country is going to hell, y*wan want to save this country from lolicon, so he starts his journey.
You heard about it and want to help y*wan, but y*wan questioned your IQ, and give you a question, so you should solve it to prove your IQ is high enough.
The problem is about counting. How many undirected graphs satisfied the following constraints?
1. This graph is a complete graph of size n.
2. Every edge has integer cost from 1 to L.
3. The cost of the shortest path from 1 to n is k.
Can you solve it?
output the answer modulo 10^9+7
Something bad actually happen. The devil makes this kingdom's people infected by a disease called lolicon. Lolicon will take away people's life in silence.
Although z*p is died, his friend, y*wan is not a lolicon. Y*wan is the only one in the country who is immune of lolicon, because he like the adult one so much.
As this country is going to hell, y*wan want to save this country from lolicon, so he starts his journey.
You heard about it and want to help y*wan, but y*wan questioned your IQ, and give you a question, so you should solve it to prove your IQ is high enough.
The problem is about counting. How many undirected graphs satisfied the following constraints?
1. This graph is a complete graph of size n.
2. Every edge has integer cost from 1 to L.
3. The cost of the shortest path from 1 to n is k.
Can you solve it?
output the answer modulo 10^9+7
Input
The first line contains an integer T, denoting the number of the test cases.
For each test case, the first line contains 3 integers n,k,L.
T<=5 n,k<=12,L<=10^9.
For each test case, the first line contains 3 integers n,k,L.
T<=5 n,k<=12,L<=10^9.
Output
For each test case, output the answer in one line.
Sample Input
2
3 3 3
4 4 4
3 3 3
4 4 4
Sample Output
8
668
668
Author
WJMZBMR
Source
题目大意:有一张n个点的无向完全图,第i个点的编号是i,每条边的边权在1到L之间的正整数,问存在多少个图使得1到n的最短路是k。
分析:神题!
一个暴力的做法是枚举所有点到1号点的最短路,记作d[i],如果d[i] == d[j],那么i,j之间的边的权值可以任意选,否则边权不能小于|di-dj|,且必然有一条边使得di + dist[i][j] = dj.只是枚举的复杂度高达13^12,承受不了.
其实我们不需要考虑每个点的最短路具体是什么,只需要考虑数量就可以了.计数题的一个转换思路.那么在dfs的时候枚举每个最短路对应的点有多少个就可以了.然后就是极其琐碎的组合数运算.
需要注意的是起点和终点的最短路都已经确定了.选取i个点的组合数要排除这两个点. 同时可能会有大于k的最短路出现,统统放到k+1处理.关于具体的组合数的运算我写在了代码里:
#include <cstdio>
#include <cstring>
#include <iostream>
#include <algorithm> using namespace std; typedef long long ll;
const int mod = 1e9+;
int T;
ll n,k,l,cnt[],ans,c[][]; void init()
{
c[][] = ;
for (int i = ; i <= ; i++)
{
c[i][] = ;
for (int j = ; j <= ; j++)
c[i][j] = (c[i - ][j] + c[i - ][j - ]) % mod;
}
} ll qpow(ll a,ll b)
{
ll res = ;
while (b)
{
if (b & )
res = (res * a) % mod;
a = (a * a) % mod;
b >>= ;
}
return res;
} ll solve(ll x)
{
if (!cnt[x])
return ;
ll x1 = ,x2 = ;
for (int i = ; i < x; i++)
{
if (!cnt[i])
continue;
if (x - i > l) //方案不合法,最短路会被更新
return ;
x1 = (x1 * qpow(l - (x - i) + ,cnt[i])) % mod; //x1是所有能选的方案
x2 = (x2 * qpow(l - (x - i),cnt[i])) % mod; //x2是所有不合法的方案
}
if (x == k + ) //如果最短路大于k了,那么所有能选的方案都是合法的,因为只是把它们归到k+1这一类,最短路并不一定要等于k+1
return qpow(x1,cnt[x]) % mod;
x1 -= x2;
if (x1 < )
x1 += mod;
return qpow(x1,cnt[x]) % mod; //之前的方案数都是对于所有的i,1个x来计算的.
} void dfs(ll dep,ll fangan,ll tot) //tot传的是1
{
if (dep == k)
{
for (int i = ; i + tot <= n; i++)
{
ll temp = fangan * c[n - tot - ][i - ] % mod; //剩下的点中选i-1个最短路为k的点,第i个点为终点,不考虑.
temp = (temp * qpow(l,c[i][])) % mod; //这两行就是两两最短路相等的算方案数
temp = (temp * qpow(l,c[n - tot - i][])) % mod;
cnt[k] = i;
cnt[k + ] = n - tot - i;
temp = (temp * solve(k)) % mod;
temp = (temp * solve(k + )) % mod; //最短路大于k的都放到k+1处计算.
ans = (ans + temp) % mod;
}
return;
}
for (int i = ; i + tot < n; i++)
{
cnt[dep] = i;
ll temp = fangan * qpow(l,c[i][]) % mod; //上面说的di == dj的情况,边权随便取
temp = (temp * c[n - tot - ][i]) % mod; //能选的点中选i个点的方案数
temp = (temp * solve(dep)) % mod;
dfs(dep + ,temp,i + tot);
}
} int main()
{
scanf("%d",&T);
init();
while (T--)
{
scanf("%lld%lld%lld",&n,&k,&l);
memset(cnt,,sizeof(cnt));
cnt[] = ; //起点被确定了
ans = ;
dfs(,,);
printf("%lld\n",ans);
} return ;
}