看到这题,我们不难想到一个dp,就是设F[i][j]为到达i节点比最短路多了j的方案总数.
但是我们发现这个状态根本没办法转移:i可以从任何一个有连边的节点转移.(有后效性)
所以我们倒着跑就好了 ~
#include<cstdio>
#include<algorithm>
#include<cstring>
#include<cstdlib>
#include<map>
#include<queue>
#include<iostream>
#include<cmath>
//#define int long long
using namespace std;
inline int gi(){char tmp=getchar();int flag=1;while(tmp<'0'||tmp>'9'){if(tmp=='-'){flag=-1;tmp=getchar();break;}tmp=getchar();}int ans=0;while(tmp<='9' and tmp>='0') {ans=ans*10+tmp-'0';tmp=getchar();}return ans*flag;}
inline void write(int x){static int stk[100], top = 0;if (x == 0) { putchar('0'); putchar(' ');return; }if (x < 0) { x = -x; putchar('-'); }while (x) { stk[++top] = x % 10; x /= 10; }while (top) { putchar(stk[top--] + '0'); }putchar(' ');}
#define line() putchar('
');
#define Mem(Arr,V) memset(Arr,V,sizeof Arr);
#define Mcpy(Arr,qwq) memcpy(Arr,qwq,sizeof qwq);
#define max3(a,b,c) max(max(a,b),c)
#define max4(a,b,c,d) max4(max3(a,b,c),d);
#define in(a) a=gi()
#define in2(a,b) in(a),in(b)
#define in3(a,b,c) in2(a,b),in(c)
#define in4(a,b,c,d) in3(a,b,c),in(d)
#define write2(a,b) write(a),write(b)
#define write3(a,b,c) write2(a,b),write(c)
#define write4(a,b,c,d) write3(a,b,c),write(d)
inline void smin(int &x,int y){x=min(x,y);}
inline void smax(int &x,int y){x=max(x,y);}
const int N = 1000001;
struct Edg{
int v,w,nxt;
}Edge[N<<1];int cnt,Head[N];
inline void Add(int u,int v,int w){Edge[++cnt].v=v;Edge[cnt].w=w;Edge[cnt].nxt=Head[u];Head[u]=cnt;}
struct Rev{
int v,w,nxt;
}Reverse[N<<1];int cnt1,Pre[N];
inline void Link(int u,int v,int w){Reverse[++cnt1].v=v;Reverse[cnt1].w=w;Reverse[cnt1].nxt=Pre[u];Pre[u]=cnt1;}
struct Node{
int pos,dis;
bool operator > (const Node &x) const {
return x.dis<dis;
}
};priority_queue<Node,vector<Node>,greater<Node> >Q;
bool Vis[N];int Dis[N];
int n,m,k,p;
inline void Dijkstra()
{
Mem(Vis,0);Mem(Dis,127);
Q.push(Node{1,0});Dis[1]=0;
while(!Q.empty())
{
int top=Q.top().pos;int dis=Q.top().dis;Q.pop();
if(Vis[top]) continue;
Vis[top]=1;
for(int i=Head[top];i;i=Edge[i].nxt)
{
int arr=Edge[i].v;
if(Edge[i].w+dis<Dis[arr])
{
Dis[arr]=Edge[i].w+dis;
Q.push(Node{arr,Dis[arr]});
}
}
}
}
int F[N][52];bool Done[N][52];
int Dfs(int pos,int l)
{
if(l>k or l<0) return 0;
if(Done[pos][l]) {Done[pos][l]=0;return -1;}
if(F[pos][l]!=-1) return F[pos][l];
Done[pos][l]=1;
int ans=0;
for(int i=Pre[pos];i;i=Reverse[i].nxt)
{
int arr=Reverse[i].v;
int tmp=Dfs(arr,l-Reverse[i].w-Dis[arr]+Dis[pos]);
if(tmp==-1)
{
Done[pos][l]=0;
return -1;
}
ans+=tmp;
ans%=p;
}
Done[pos][l]=0;
if(pos==1 and l==0)
{
F[pos][l]=1;
return 1;
}
return F[pos][l]=ans;
}
signed main()
{
#ifndef ONLINE_JUDGE
freopen("data.in","r",stdin);
#endif
int T=gi();
while(T--)
{
cnt=cnt1=0;Mem(Head,0);Mem(Pre,0);
in4(n,m,k,p);
for(int i=1;i<=m;++i)
{
int u,v,w;in3(u,v,w);
Add(u,v,w);Link(v,u,w);
}
Dijkstra();
// for(int i=1;i<=n;++i)
// write(Dis[i]);
// return 0;
Mem(F,-1);
int ans=0;int flag=0;
for(int i=0;i<=k;++i)
{
int tmp=Dfs(n,i);
if(tmp==-1)
{
puts("-1");
flag=1;
break;
}
ans+=tmp;
ans%=p;
}
if(!flag)
{
write(ans);line();
}
}
}