题意:
给(n(1 leq n leq 10^5))一棵树,每个点有个权值。
还有(m(1 leq m leq 10^5))个询问:
(u \, v \, k),查询路径(u o v)上权值第(k)小的权值。
分析:
和普通的区间一样,对于树维护到根节点的路径信息,父亲节点代表的树就是它的前一棵树。
查询的时候还要求出(LCA(u,v)),路径上的点数就是:
- (u)到根的个数+(v)到根的个数-(lca)到根的个数( imes 2)
如果(lca)的权值也在统计范围内,统计个数再加(1)。
#include <cstdio>
#include <cstring>
#include <algorithm>
using namespace std;
const int maxn = 100000 + 10;
struct Edge
{
int v, nxt;
Edge() {}
Edge(int v, int nxt): v(v), nxt(nxt) {}
};
int head[maxn], ecnt;
Edge edges[maxn * 2];
void AddEdge(int u, int v) {
edges[ecnt] = Edge(v, head[u]);
head[u] = ecnt++;
}
int fa[maxn], L[maxn];
void dfs(int u) {
for(int i = head[u]; ~i; i = edges[i].nxt) {
int v = edges[i].v;
if(v == fa[u]) continue;
fa[v] = u;
L[v] = L[u] + 1;
dfs(v);
}
}
int n, m;
int anc[maxn][20];
void preprocess() {
memset(anc, 0, sizeof(anc));
for(int i = 1; i <= n; i++) anc[i][0] = fa[i];
for(int j = 1; (1 << j) < n; j++)
for(int i = 1; i <= n; i++) if(anc[i][j-1])
anc[i][j] = anc[anc[i][j-1]][j-1];
}
int LCA(int u, int v) {
if(L[u] < L[v]) swap(u, v);
int log;
for(log = 0; (1 << log) < L[u]; log++);
for(int i = log; i >= 0; i--)
if(L[u] - (1<<i) >= L[v]) u = anc[u][i];
if(u == v) return u;
for(int i = log; i >= 0; i--)
if(anc[u][i] && anc[u][i] != anc[v][i])
u = anc[u][i], v = anc[v][i];
return fa[u];
}
int a[maxn], b[maxn], tot;
struct Node
{
int lch, rch, sum;
};
int sz;
Node T[maxn << 5];
int root[maxn];
int newnode() {
sz++;
T[sz].lch = T[sz].rch = T[sz].sum = 0;
return sz;
}
int update(int pre, int L, int R, int p) {
int rt = newnode();
T[rt].lch = T[pre].lch;
T[rt].rch = T[pre].rch;
T[rt].sum = T[pre].sum + 1;
if(L == R) return rt;
int M = (L + R) / 2;
if(p <= M) T[rt].lch = update(T[pre].lch, L, M, p);
else T[rt].rch = update(T[pre].rch, M+1, R, p);
return rt;
}
void dfs2(int u) {
root[u] = update(root[fa[u]], 1, tot, a[u]);
for(int i = head[u]; ~i; i = edges[i].nxt) {
int v = edges[i].v;
if(v == fa[u]) continue;
dfs2(v);
}
}
int tmp;
int query(int u, int v, int l, int L, int R, int k) {
if(L == R) return L;
int M = (L + R) / 2;
int sum = T[T[u].lch].sum + T[T[v].lch].sum - T[T[l].lch].sum * 2;
if(L <= tmp && tmp <= M) sum++;
if(sum >= k) return query(T[u].lch, T[v].lch, T[l].lch, L, M, k);
else return query(T[u].rch, T[v].rch, T[l].rch, M+1, R, k - sum);
}
int main()
{
scanf("%d%d", &n, &m);
for(int i = 1; i <= n; i++) {
scanf("%d", a + i);
b[i] = a[i];
}
ecnt = 0;
memset(head, -1, sizeof(head));
for(int i = 1; i < n; i++) {
int u, v; scanf("%d%d", &u, &v);
AddEdge(u, v); AddEdge(v, u);
}
dfs(1);
preprocess();
sort(b + 1, b + 1 + n);
tot = unique(b + 1, b + 1 + n) - b - 1;
for(int i = 1; i <= n; i++)
a[i] = lower_bound(b + 1, b + 1 + tot, a[i]) - b;
dfs2(1);
while(m--) {
int u, v, k; scanf("%d%d%d", &u, &v, &k);
int lca = LCA(u, v);
tmp = a[lca];
int ans = query(root[u], root[v], root[lca], 1, tot, k);
printf("%d
", b[ans]);
}
return 0;
}