Codeforces Round #550 (Div. 3) F. Graph Without Long Directed Paths
You are given a connected undirected graph consisting of nn vertices and mm edges. There are no self-loops or multiple edges in the given graph.
You have to direct its edges in such a way that the obtained directed graph does not contain any paths of length two or greater (where the length of path is denoted as the number of traversed edges).
The first line contains two integer numbers nn and mm (2≤n≤2⋅1052≤n≤2⋅105, n−1≤m≤2⋅105n−1≤m≤2⋅105) — the number of vertices and edges, respectively.
The following mm lines contain edges: edge ii is given as a pair of vertices uiui, vivi (1≤ui,vi≤n1≤ui,vi≤n, ui≠viui≠vi). There are no multiple edges in the given graph, i. e. for each pair (ui,viui,vi) there are no other pairs (ui,viui,vi) and (vi,uivi,ui) in the list of edges. It is also guaranteed that the given graph is connected (there is a path between any pair of vertex in the given graph).
If it is impossible to direct edges of the given graph in such a way that the obtained directed graph does not contain paths of length at least two, print "NO" in the first line.
Otherwise print "YES" in the first line, and then print any suitable orientation of edges: a binary string (the string consisting only of '0' and '1') of length mm. The ii-th element of this string should be '0' if the ii-th edge of the graph should be directed from uiui to vivi, and '1' otherwise. Edges are numbered in the order they are given in the input.
6 5 1 5 2 1 1 4 3 1 6 1
YES 10100
The picture corresponding to the first example:
And one of possible answers:
题意就是给一个无环无重边的无向图,把相邻两个点染异色,如果可以输出染色情况,否则输出NO
扫一遍图就行了
FUCK 我试着用bfs写 怎么都写不对 mdzz
#include<bits/stdc++.h> using namespace std; typedef long long ll; const int maxn=2e5+5; const int INF=1e9+5; typedef pair<int,int> pii; int n,m,vis[maxn],cnt,ans[maxn],a[maxn],f,pre[maxn]; int mp[maxn]; vector<pii>e[maxn]; void init(int x) { for(int i=0; i<=x; i++) e[i].clear(); memset(vis,0,sizeof(vis)); memset(ans,-1,sizeof(ans)); memset(pre,-1,sizeof(pre)); } void dfs(int now,int pre,int t) { ans[now]=t; for(int i=0; i<e[now].size(); i++) { int v=e[now][i].first; if(v==pre) continue; if(ans[v]==-1) dfs(v,now,!t); else if(ans[v]==ans[now]) f=1; } return; } int main() { cin>>n>>m; init(n); for(int i=1; i<=m; i++) { int x,y; cin>>x>>y; a[i]=x; e[x].push_back(make_pair(y,-1)); e[y].push_back(make_pair(x,-1)); } dfs(1,-1,0); if(f!=1) { cout<<"YES"<<endl; for(int i=1; i<=m; i++) cout<<ans[a[i]]; cout<<endl; } else cout<<"NO"<<endl; return 0; }