主席树+二分

每次对给定区间从1～区间长度len二分mid，查询区间内第mid大的数是不是大于等于mid。。

#include <bits/stdc++.h>

#define INF 0x3f3f3f3f

#define full(a, b) memset(a, b, sizeof a)

using namespace std;

typedef long long ll;

inline int lowbit(int x){ return x & (-x); }

inline int read(){

    int X = 0, w = 0; char ch = 0;

    while(!isdigit(ch)) { w |= ch == '-'; ch = getchar(); }

    while(isdigit(ch)) X = (X << 3) + (X << 1) + (ch ^ 48), ch = getchar();

    return w ? -X : X;

}

inline int gcd(int a, int b){ return a % b ? gcd(b, a % b) : b; }

inline int lcm(int a, int b){ return a / gcd(a, b) * b; }

template<typename T>

inline T max(T x, T y, T z){ return max(max(x, y), z); }

template<typename T>

inline T min(T x, T y, T z){ return min(min(x, y), z); }

template<typename A, typename B, typename C>

inline A fpow(A x, B p, C lyd){

    A ans = 1;

    for(; p; p >>= 1, x = 1LL * x * x % lyd)if(p & 1)ans = 1LL * x * ans % lyd;

    return ans;

}

const int N = 200005;

int n, q, tot, tree[20*N], lc[20*N], rc[20*N], a[N], b[N], root[N];

int buildTree(int l, int r){

    int cur = ++tot;

    if(l == r) return tot;

    int mid = (l + r) >> 1;

    lc[cur] = buildTree(l, mid);

    rc[cur] = buildTree(mid + 1, r);

    return cur;

}

int modify(int rt, int l, int r, int p){

    int cur = ++tot;

    tree[cur] = tree[rt] + 1, lc[cur] = lc[rt], rc[cur] = rc[rt];

    if(l == r) return cur;

    int mid = (l + r) >> 1;

    if(p <= mid) lc[cur] = modify(lc[cur], l, mid, p);

    else rc[cur] = modify(rc[cur], mid + 1, r, p);

    return cur;

}

int query(int a, int b, int l, int r, int k){

    int p = tree[lc[a]] - tree[lc[b]];

    if(l == r) return l;

    int mid = (l + r) >> 1;

    if(k <= p) return query(lc[a], lc[b], l, mid, k);

    return query(rc[a], rc[b], mid + 1, r, k - p);

}

int main(){

    while(~scanf("%d%d", &n, &q)){

        full(a, 0), full(b, 0), full(tree, 0), full(lc, 0), full(rc, 0), full(root, 0);

        for(int i = 1; i <= n; i++) b[i] = a[i] = read();

        sort(b + 1, b + n + 1);

        int k = unique(b + 1, b + n + 1) - b - 1;

        root[0] = buildTree(1, k);

        for(int i = 1; i <= n; i++){

            int p = lower_bound(b + 1, b + k + 1, a[i]) - b;

            root[i] = modify(root[i - 1], 1, k, p);

        }

        while(q --){

            int u = read(), v = read();

            int l = 1, r = v - u + 1, len = v - u + 1;

            while(l < r){

                int mid = (l + r + 1) >> 1;

                int tmp = b[query(root[v], root[u - 1], 1, k, len - mid + 1)];

                if(tmp < mid) r = mid - 1;

                else l = mid;

            }

            printf("%d\n", l);

        }

    }

    return 0;

}