bzoj3809 Gty的二逼妹子序列 & bzoj3236 [Ahoi2013]作业 莫队+分块
题目传送门
https://lydsy.com/JudgeOnline/problem.php?id=3809
https://lydsy.com/JudgeOnline/problem.php?id=3236
几乎是双倍经验。
题解
对于第一道题目:
如果没有 \(a, b\) 这个区间的限制,那么这道题就是 bzoj1878 [SDOI2009]HH的项链。
这道题虽然有 \(log\) 的做法,不过很多人应该都是拿这道题作为莫队的入门题的。
考虑如果带上范围限制怎么做。
一种显然的做法就是在莫队修改的时候用树状数组维护一下。但是复杂度 \(O(m\sqrt n \log n)\) GG。
我们需要一种能够 \(O(1)\) 进行修改,查询可以稍微慢一些的数据结构。
符合这个要求的只有分块。
于是做法就是 在莫队修改的时候用分块维护一下每一个权值块的和。
第二道题类似,只是需要多求一个某个区间某个范围的数的个数,一样求就可以了。
时间复杂度 \(O(m\sqrt n)\)。
Code bzoj3809
#include<bits/stdc++.h>
#define fec(i, x, y) (int i = head[x], y = g[i].to; i; i = g[i].ne, y = g[i].to)
#define dbg(...) fprintf(stderr, __VA_ARGS__)
#define File(x) freopen(#x".in", "r", stdin), freopen(#x".out", "w", stdout)
#define fi first
#define se second
#define pb push_back
template<typename A, typename B> inline char smax(A &a, const B &b) {return a < b ? a = b, 1 : 0;}
template<typename A, typename B> inline char smin(A &a, const B &b) {return b < a ? a = b, 1 : 0;}
typedef long long ll; typedef unsigned long long ull; typedef std::pair<int, int> pii;
template<typename I> inline void read(I &x) {
int f = 0, c;
while (!isdigit(c = getchar())) c == '-' ? f = 1 : 0;
x = c & 15;
while (isdigit(c = getchar())) x = (x << 1) + (x << 3) + (c & 15);
f ? x = -x : 0;
}
const int N = 100000 + 7;
const int M = 1000000 + 7;
const int B = 316 + 7;
#define bl(x) (((x) - 1) / blo + 1)
#define st(x) (((x) - 1) * blo + 1)
#define ed(x) std::min((x) * blo, n)
int n, m, blo, cnt;
int a[N], s[N], ans[N], ansb[N];
int ansc[M];
struct Query {
int l, r, a, b, *ans;
inline bool operator < (const Query &b) const { return bl(l) != bl(b.l) ? l < b.l : r < b.r; }
} q[M];
inline void qadd(int x, int k) {
ans[x] += k;
ansb[bl(x)] += k;
}
inline int qsum(int l, int r) {
int cnt = 0;
for (int i = l; i <= std::min(ed(bl(l)), r); ++i) cnt += ans[i];
for (int i = bl(l) + 1; i < bl(r); ++i) cnt += ansb[i];
if (bl(l) != bl(r)) for (int i = st(bl(r)); i <= r; ++i) cnt += ans[i];
return cnt;
}
inline void madd(int x) {
++cnt;
++s[a[x]];
if (s[a[x]] == 1) qadd(a[x], 1);
}
inline void mdel(int x) {
++cnt;
--s[a[x]];
if (!s[a[x]]) qadd(a[x], -1);
}
inline void work() {
std::sort(q + 1, q + m + 1);
int l = 1, r = 0;
for (int i = 1; i <= m; ++i) {
while (l > q[i].l) madd(--l);
while (r < q[i].r) madd(++r);
while (l < q[i].l) mdel(l++);
while (r > q[i].r) mdel(r--);
*q[i].ans = qsum(q[i].a, q[i].b);
// dbg("l = %d, r = %d: ", l, r);
// for (int i = 1; i <= n; ++i) dbg("%d%c", ans[i], " \n"[i == n]);
// if (i >= 106250) dbg("i = %d, cnt = %d\n", i, cnt);
}
for (int i = 1; i <= m; ++i) printf("%d\n", ansc[i]);
}
inline void init() {
read(n), read(m);
blo = sqrt(n);
for (int i = 1; i <= n; ++i) read(a[i]);
for (int i = 1; i <= m; ++i) read(q[i].l), read(q[i].r), read(q[i].a), read(q[i].b), q[i].ans = ansc + i;
}
int main() {
#ifdef hzhkk
freopen("hkk.in", "r", stdin);
#endif
init();
work();
fclose(stdin), fclose(stdout);
return 0;
}
Code bzoj 3236
#include<bits/stdc++.h>
#define fec(i, x, y) (int i = head[x], y = g[i].to; i; i = g[i].ne, y = g[i].to)
#define dbg(...) fprintf(stderr, __VA_ARGS__)
#define File(x) freopen(#x".in", "r", stdin), freopen(#x".out", "w", stdout)
#define fi first
#define se second
#define pb push_back
template<typename A, typename B> inline char smax(A &a, const B &b) {return a < b ? a = b, 1 : 0;}
template<typename A, typename B> inline char smin(A &a, const B &b) {return b < a ? a = b, 1 : 0;}
typedef long long ll; typedef unsigned long long ull; typedef std::pair<int, int> pii;
template<typename I> inline void read(I &x) {
int f = 0, c;
while (!isdigit(c = getchar())) c == '-' ? f = 1 : 0;
x = c & 15;
while (isdigit(c = getchar())) x = (x << 1) + (x << 3) + (c & 15);
f ? x = -x : 0;
}
const int N = 100000 + 7;
const int M = 1000000 + 7;
const int B = 316 + 7;
#define bl(x) (((x) - 1) / blo + 1)
#define st(x) (((x) - 1) * blo + 1)
#define ed(x) std::min((x) * blo, n)
int n, m, blo;
int a[N], s[N], ans[N], ansb[N], ansa[N];
pii ansc[M];
struct Query {
int l, r, a, b;
pii *ans;
inline bool operator < (const Query &b) const { return bl(l) != bl(b.l) ? l < b.l : r < b.r; }
} q[M];
inline void qadd(int x, int k) {
ans[x] += k, ansa[bl(x)] += k;
if (ans[x] == 1 && k == 1) ++ansb[bl(x)];
if (ans[x] == 0 && k == -1) --ansb[bl(x)];
}
inline int qsumb(int l, int r) {
int cnt = 0;
for (int i = l; i <= std::min(ed(bl(l)), r); ++i) cnt += !!ans[i];
for (int i = bl(l) + 1; i < bl(r); ++i) cnt += ansb[i];
if (bl(l) != bl(r)) for (int i = st(bl(r)); i <= r; ++i) cnt += !!ans[i];
return cnt;
}
inline int qsuma(int l, int r) {
int cnt = 0;
for (int i = l; i <= std::min(ed(bl(l)), r); ++i) cnt += ans[i];
for (int i = bl(l) + 1; i < bl(r); ++i) cnt += ansa[i];
if (bl(l) != bl(r)) for (int i = st(bl(r)); i <= r; ++i) cnt += ans[i];
return cnt;
}
inline void madd(int x) {
++s[a[x]];
qadd(a[x], 1);
}
inline void mdel(int x) {
--s[a[x]];
qadd(a[x], -1);
}
inline void work() {
std::sort(q + 1, q + m + 1);
int l = 1, r = 0;
for (int i = 1; i <= m; ++i) {
while (l > q[i].l) madd(--l);
while (r < q[i].r) madd(++r);
while (l < q[i].l) mdel(l++);
while (r > q[i].r) mdel(r--);
*q[i].ans = pii(qsuma(q[i].a, q[i].b), qsumb(q[i].a, q[i].b));
// dbg("l = %d, r = %d: ", l, r);
// for (int i = 1; i <= n; ++i) dbg("%d%c", ans[i], " \n"[i == n]);
// if (i >= 106250) dbg("i = %d, cnt = %d\n", i, cnt);
}
for (int i = 1; i <= m; ++i) printf("%d %d\n", ansc[i].fi, ansc[i].se);
}
inline void init() {
read(n), read(m);
blo = sqrt(n);
for (int i = 1; i <= n; ++i) read(a[i]);
for (int i = 1; i <= m; ++i) read(q[i].l), read(q[i].r), read(q[i].a), read(q[i].b), q[i].ans = ansc + i;
}
int main() {
#ifdef hzhkk
freopen("hkk.in", "r", stdin);
#endif
init();
work();
fclose(stdin), fclose(stdout);
return 0;
}