SPOJ QTREE Query on a Tree【树链剖分模板题】
树链剖分,线段树维护~
#include <cstdio> #include <cstring> #include <iostream> #include <algorithm> #include <vector> using namespace std; const int MAXN = 10014; struct Edge { int to,next; }edge[MAXN*2]; int head[MAXN],tot; int top[MAXN];//top[v]表示v所在的重链的顶端节点 int fa[MAXN]; //父亲节点 int deep[MAXN];//深度 int num[MAXN];//num[v]表示以v为根的子树的节点数 int p[MAXN];//p[v]表示v与其父亲节点的连边在线段树中的位置 int fp[MAXN];//和p数组相反 int son[MAXN];//重儿子 int pos; void init() { tot = 0; memset(head,-1,sizeof(head)); pos = 0; memset(son,-1,sizeof(son)); } void addedge(int u,int v) { edge[tot].to = v;edge[tot].next = head[u];head[u] = tot++; } void dfs1(int u,int pre,int d) //第一遍dfs求出fa,deep,num,son { deep[u] = d; fa[u] = pre; num[u] = 1; for(int i = head[u];i != -1; i = edge[i].next) { int v = edge[i].to; if(v != pre) { dfs1(v,u,d+1); num[u] += num[v]; if(son[u] == -1 || num[v] > num[son[u]]) son[u] = v; } } } void getpos(int u,int sp) //第二遍dfs求出top和p { top[u] = sp; if(son[u] != -1) { p[u] = pos++; fp[p[u]] = u; getpos(son[u],sp); } else { p[u] = pos++; fp[p[u]] = u; return; } for(int i = head[u] ; i != -1; i = edge[i].next) { int v = edge[i].to; if(v != son[u] && v != fa[u]) getpos(v,v); } } //线段树 struct Node { int l,r; int Max; }segTree[MAXN*3]; void build(int i,int l,int r) { segTree[i].l = l; segTree[i].r = r; segTree[i].Max = 0; if(l == r)return; int mid = (l+r)/2; build(i<<1,l,mid); build((i<<1)|1,mid+1,r); } void push_up(int i) { segTree[i].Max = max(segTree[i<<1].Max,segTree[(i<<1)|1].Max); } void update(int i,int k,int val) // 更新线段树的第k个值为val { if(segTree[i].l == k && segTree[i].r == k) { segTree[i].Max = val; return; } int mid = (segTree[i].l + segTree[i].r)/2; if(k <= mid)update(i<<1,k,val); else update((i<<1)|1,k,val); push_up(i); } int query(int i,int l,int r) //查询线段树中[l,r] 的最大值 { if(segTree[i].l == l && segTree[i].r == r) return segTree[i].Max; int mid = (segTree[i].l + segTree[i].r)/2; if(r <= mid)return query(i<<1,l,r); else if(l > mid)return query((i<<1)|1,l,r); else return max(query(i<<1,l,mid),query((i<<1)|1,mid+1,r)); } int find(int u,int v)//查询u->v边的最大值 { int f1 = top[u], f2 = top[v]; int tmp = 0; while(f1 != f2) { if(deep[f1] < deep[f2]) { swap(f1,f2); swap(u,v); } tmp = max(tmp,query(1,p[f1],p[u])); u = fa[f1]; f1 = top[u]; } if(u == v)return tmp; if(deep[u] > deep[v]) swap(u,v); return max(tmp,query(1,p[son[u]],p[v])); } int e[MAXN][3]; int main() { //freopen("in.txt","r",stdin); //freopen("out.txt","w",stdout); int T; int n; scanf("%d",&T); while(T--) { init(); scanf("%d",&n); for(int i = 0;i < n-1;i++) { scanf("%d%d%d",&e[i][0],&e[i][1],&e[i][2]); addedge(e[i][0],e[i][1]); addedge(e[i][1],e[i][0]); } dfs1(1,0,0); getpos(1,1); build(1,0,pos-1); for(int i = 0;i < n-1; i++) { if(deep[e[i][0]] > deep[e[i][1]]) swap(e[i][0],e[i][1]); update(1,p[e[i][1]],e[i][2]); } char op[10]; int u,v; while(scanf("%s",op) == 1) { if(op[0] == 'D')break; scanf("%d%d",&u,&v); if(op[0] == 'Q') printf("%d\n",find(u,v)); else update(1,p[e[u-1][1]],v); } } return 0; }