题目大意:有$n(n\leqslant4\times10^4)$个数,$m(m\leqslant5\times10^4)$个询问,每次问区间$[l,r]$内的众数,若相同输出最小的,强制在线。
题解:先离散化,分块,设块大小为$S$,可以在$O(\dfrac n S n)$的复杂度内预处理出每两个块间的众数。考虑询问,发现询问中的众数要么是整块的那一个众数,要么就是非整块内出现过的数,可以用主席树查询区间数出现个数,比较一下即可,一次查询复杂度$O(2S\log_2 n)$。$S$开的比$\sqrt n$小一点就行了
卡点:主席树查询时左端点没有减一,数组开小
C++ Code:
#include <algorithm>
#include <cctype>
#include <cstdio>
#include <cstring>
namespace __IO {
namespace R {
int x, ch;
inline int read() {
while (isspace(ch = getchar()));
for (x = ch & 15; isdigit(ch = getchar());) x = x * 10 + (ch & 15);
return x;
}
}
}
using __IO::R::read;
#define maxn 40010
const int BSZ = 100, Bnum = maxn / BSZ + 5;
namespace SgT {
#define N (maxn * 20)
int lc[N], rc[N], V[N], idx;
void insert(int &rt, const int l, const int r, const int num) {
lc[++idx] = lc[rt], rc[idx] = rc[rt], V[idx] = V[rt] + 1, rt = idx;
if (l == r) return ;
const int mid = l + r >> 1;
if (num <= mid) insert(lc[rt], l, mid, num);
else insert(rc[rt], mid + 1, r, num);
}
int query(const int L, const int R, const int l, const int r, const int num) {
if (l == r) return V[R] - V[L];
const int mid = l + r >> 1;
if (num <= mid) return query(lc[L], lc[R], l, mid, num);
else return query(rc[L], rc[R], mid + 1, r, num);
}
#undef N
}
int n, m, ans, anscnt;
int rt[maxn];
int v[maxn], s[maxn], bl[maxn];
int L[Bnum], R[Bnum], cnt[maxn];
int Max[Bnum][Bnum];
int main() {
n = read(), m = read();
for (int i = 1; i <= n; i++) {
v[i] = s[i] = read(); bl[i] = i / BSZ + 1;
}
int tot = (std::sort(v + 1, v + n + 1), std::unique(v + 1, v + n + 1) - v - 1);
for (int i = 1; i <= n; i++) {
SgT::insert(rt[i] = rt[i - 1], 1, tot, s[i] = std::lower_bound(v + 1, v + tot + 1, s[i]) - v);
}
const int B = bl[n];
for (int i = 1; i <= B; i++) L[i] = (i - 1) * BSZ, R[i] = L[i] + BSZ - 1;
L[1] = 1, R[B] = n;
for (int l = 1, r, M; l <= B; l++) {
r = l, M = 0;
memset(cnt, 0, sizeof cnt);
for (int i = L[l]; i <= n; i++) {
cnt[s[i]]++;
if (cnt[s[i]] > cnt[M] || (cnt[s[i]] == cnt[M] && s[i] < M)) M = s[i];
if (i == R[r]) Max[l][r] = M, r++;
}
}
while (m --> 0) {
int l = (read() + ans - 1) % n + 1, r = (read() + ans - 1) % n + 1;
if (l > r) std::swap(l, r);
const int lb = bl[l], rb = bl[r];
ans = anscnt = 0;
#define check(x) {\
const int tmp = SgT::query(rt[l - 1], rt[r], 1, tot, x); \
if (tmp > anscnt || (tmp == anscnt && x < ans)) ans = x, anscnt = tmp;\
}
if (lb == rb) {
for (register int i = l; i <= r; i++) check(s[i]);
} else {
for (register int i = l; i <= R[lb]; i++) check(s[i]);
if (lb + 1 <= rb - 1) check(Max[lb + 1][rb - 1]);
for (register int i = L[rb]; i <= r; i++) check(s[i]);
}
#undef check
printf("%d\n", ans = v[ans]);
}
return 0;
}