1576: [Usaco2009 Jan]安全路经Travel
Time Limit: 10 Sec Memory Limit: 64 MB
Submit: 665 Solved: 227[Submit][Status]
Description
Input
* 第一行: 两个空格分开的数, N和M
* 第2..M+1行: 三个空格分开的数a_i, b_i,和t_i
Output
* 第1..N-1行: 第i行包含一个数:从牛棚_1到牛棚_i+1并且避免从牛棚1到牛棚i+1最短路经上最后一条牛路的最少的时间.如果这样的路经不存在,输出-1.
Sample Input
4 5
1 2 2
1 3 2
3 4 4
3 2 1
2 4 3
输入解释:
跟题中例子相同
1 2 2
1 3 2
3 4 4
3 2 1
2 4 3
输入解释:
跟题中例子相同
Sample Output
3
3
6
输出解释:
跟题中例子相同
3
6
输出解释:
跟题中例子相同
HINT
Source
这道题本来的思路是对于每个子树维护一个单调队列,但是看着写链剖都能T的那么惨,还是老老实实写链剖吧。
这道题给我最大的启示是:最短路用spfa是非常作死的。。。。。不过以前我都默认spfa最坏为nlogn的。
至少我一整个下午都没有想到usaco的题居然还要卡spfa。
#include<iostream> #include<cstdio> #include<cstring> #include<algorithm> using namespace std; #define MAXN 110000 #define MAXQ MAXN*20 #define MAXE (MAXN*4 +MAXN*2) #define MAXV MAXN #define INF 0x3f3f3f3f #define lch (now<<1) #define rch (now<<1^1) int n,m; inline int nextInt() { register int x=0; register char ch; while (ch=getchar(),ch<'0' || ch>'9'); while (x=x*10+ch-'0',ch=getchar(),ch<='9' && ch>='0'); return x; } struct sgt_node { int l,r,val,lazy; }sgt[MAXN*4]; inline void down(int now) { sgt[lch].val=min(sgt[lch].val,sgt[now].val); sgt[rch].val=min(sgt[rch].val,sgt[now].val); } void Build_sgt(int now,int l,int r) { sgt[now].l=l;sgt[now].r=r; if (sgt[now].l==sgt[now].r) { sgt[now].val=INF; return ; } Build_sgt(lch,l,(l+r)>>1); Build_sgt(rch,((l+r)>>1)+1,r); sgt[now].val=max(sgt[lch].val,sgt[rch].val); } void Modify_sgt(int now,int l,int r,int v) { if (sgt[now].l==l && sgt[now].r==r) { sgt[now].val=min(sgt[now].val,v); return ; } down(now); int mid=(sgt[now].l+sgt[now].r)>>1; if (r<=mid) Modify_sgt(lch,l,r,v); else if (mid<l) Modify_sgt(rch,l,r,v); else Modify_sgt(lch,l,mid,v),Modify_sgt(rch,mid+1,r,v); } int Query_sgt(int now,int pos) { if (sgt[now].l==sgt[now].r)return sgt[now].val; if (pos<=((sgt[now].l+sgt[now].r)>>1)) return min(sgt[now].val,Query_sgt(lch,pos)); else return min(sgt[now].val,Query_sgt(rch,pos)); } struct Edge { int np,val; Edge *next; Edge *neg; }E[MAXE],*V[MAXV],*V2[MAXV]; int tope=-1; inline void addedge(int x,int y,int z) { E[++tope].np=y; E[tope].val=z; E[tope].next=V[x]; V[x]=&E[tope]; } inline void addedge2(int x,int y,int z) { E[++tope].np=y; E[tope].val=z; E[tope].next=V2[x]; V2[x]=&E[tope]; } int q[MAXQ]; bool vis[MAXN]; int pnt[MAXN]; int dis[MAXN]; Edge *pne[MAXN]; /* void spfa(register int now) { register int head=-1,tail=0; memset(dis,INF,sizeof(dis)); q[0]=now; dis[now]=0; register Edge *ne; while (head!=tail) { head++; if (head==MAXQ)head=0; now=q[head]; vis[now]=false; for (ne=V[now];ne;ne=ne->next) { if (dis[ne->np]>dis[now]+ne->val) { dis[ne->np]=dis[now]+ne->val; pne[ne->np]=ne->neg; pnt[ne->np]=now; if (!vis[ne->np]) { tail++; if (tail==MAXQ)tail=0; q[tail]=ne->np; vis[ne->np]=true; } } } } }*/ pair<int,int> h[MAXQ]; void dijkstrea(int now) { memset(dis,INF,sizeof(dis)); dis[now]=0; int toph=0; Edge *ne; h[toph]=make_pair(-0,now); push_heap(h,h+(++toph)); while (~toph) { if (h[0].first!=-dis[h[0].second]) { pop_heap(h,h+(toph--)); continue; } for (ne=V[h[0].second];ne;ne=ne->next) { if (dis[ne->np]>dis[h[0].second] + ne->val) { dis[ne->np]=dis[h[0].second]+ne->val; pnt[ne->np]=h[0].second; pne[ne->np]=ne->neg; h[toph]=make_pair(-dis[ne->np],ne->np); push_heap(h,h+(++toph)); } } pop_heap(h,h+(toph--)); } } int son[MAXN]; int top[MAXN]; int depth[MAXN]; int pos[MAXN],dfstime=0; int dfs1(int now) { register Edge *ne; int mxsiz=0; int siz=1,t; for (ne=V2[now];ne;ne=ne->next) { depth[ne->np]=depth[now]+1; siz+=t=dfs1(ne->np); if (t>mxsiz) { mxsiz=t; son[now]=ne->np; } } return siz; } void dfs2(int now,int tp) { register Edge *ne; pos[now]=++dfstime; top[now]=tp; if (~son[now]) dfs2(son[now],tp); for (ne=V2[now];ne;ne=ne->next) { if (ne->np==son[now])continue; dfs2(ne->np,ne->np); } } int lca(register int x,register int y) { while (x!=y) { if (top[x]==top[y]) { if (depth[x]<depth[y])return x; else return y; } if (depth[top[x]]<depth[top[y]])swap(x,y); x=pnt[top[x]]; } return x; } void work() { register Edge *ne; register int now,i,d,t; for (i=2;i<=n;i++) { for(ne=V[i];ne;ne=ne->next) { now=i; if (ne==pne[now])continue; d=dis[ne->np]+ne->val +dis[now]; t=lca(ne->np,now); if (t==now)continue; while (true) { if (depth[top[now]]==depth[top[t]]) { if (pos[t]+1<=pos[now]) Modify_sgt(1,pos[t]+1,pos[now],d); break; } Modify_sgt(1,pos[top[now]],pos[now],d); now=pnt[top[now]]; } } } int ans; for (i=2;i<=n;i++) { ans=-dis[i]+Query_sgt(1,pos[i]); if (ans+dis[i]==INF) printf("-1 "); else printf("%d ",ans); } } int main() { freopen("input.txt","r",stdin); //freopen("output.txt","w",stdout); int i,j,k,x,y,z; n=nextInt();m=nextInt(); for (i=0;i<m;i++) { x=nextInt(),y=nextInt(),z=nextInt(); addedge(x,y,z); addedge(y,x,z); V[x]->neg=V[y]; V[y]->neg=V[x]; } dijkstrea(1); memset(son,-1,sizeof(son)); for (i=2;i<=n;i++) addedge2(pnt[i],i,INF); dfs1(1); dfs2(1,1); Build_sgt(1,1,dfstime); work(); }