洛谷P3327 [SDOI2015]约数个数和 【莫比乌斯反演】
题目
设d(x)为x的约数个数,给定N、M,求\(\sum_{i = 1}^{N} \sum_{j = 1}^{M} d(ij)\)
输入格式
输入文件包含多组测试数据。第一行,一个整数T,表示测试数据的组数。接下来的T行,每行两个整数N、M。
输出格式
T行,每行一个整数,表示你所求的答案。
输入样例
2
7 4
5 6
输出样例
110
121
提示
1<=N, M<=50000
1<=T<=50000
题解
好神的题【是我太弱吧】
首先上来就伤结论。。
题目所求
\[ans = \sum_{i = 1}^{N} \sum_{j = 1}^{M} d(ij)
\]
有一个这样的结论:
\[d(ij) = \sum_{x|i}\sum_{y|j} [gcd(x,y) == 1]
\]
那么就转化为了:
\[ans =\sum_{i = 1}^{N} \sum_{j = 1}^{M} \sum_{x|i}\sum_{y|j} [gcd(x,y) == 1]
\]
我们考虑对于每一对互质的x、y,x会被枚举\(\lfloor \frac{N}{x} \rfloor\)次,y会被枚举\(\lfloor \frac{M}{y} \rfloor\)次
所以有
\[ans =\sum_{i = 1}^{N} \sum_{j = 1}^{M} \lfloor \frac{N}{i} \rfloor \lfloor \frac{M}{j} \rfloor [gcd(i,j) == 1]
\]
那么可以进行莫比乌斯反演了
令
\[f(n) = \sum_{i = 1}^{N} \sum_{j = 1}^{M} \lfloor \frac{N}{i} \rfloor \lfloor \frac{M}{j} \rfloor [gcd(i,j) == n]
\]
\[F(n) = \sum_{i = 1}^{N} \sum_{j = 1}^{M} \lfloor \frac{N}{i} \rfloor \lfloor \frac{M}{j} \rfloor [n | gcd(i,j)]
\]
那么有
\[\begin{aligned}
F(d) &= (\sum_{i = 1}^{N}\lfloor \frac{N}{i} \rfloor) * (\sum_{j = 1}^{M} \lfloor \frac{M}{j} \rfloor) [d | gcd(i,j)] \\
&= (\sum_{i = 1}^{\lfloor \frac{N}{d} \rfloor}\lfloor \frac{N}{id} \rfloor) * (\sum_{j = 1}^{\lfloor \frac{M}{d} \rfloor} \lfloor \frac{M}{jd} \rfloor) \\
&= (\sum_{i = 1}^{\lfloor \frac{N}{d} \rfloor}\lfloor \frac{\lfloor \frac{N}{d} \rfloor}{i} \rfloor) * (\sum_{j = 1}^{\lfloor \frac{M}{d} \rfloor} \lfloor \frac{\lfloor \frac{M}{d} \rfloor}{j} \rfloor)
\end{aligned}
\]
其中\(\sum_{i = 1}^{N}\lfloor \frac{N}{i} \rfloor\)可以\(O(n\sqrt{n})\)预处理出,我们记为\(sum(n)\)
那么
\[F(n) = sum(\lfloor \frac{N}{n} \rfloor) * sum(\lfloor \frac{M}{n} \rfloor)
\]
\[ans = f(1) = \sum_{d = 1}^{N} \mu(d) * F(d) = \sum_{d} \mu(d) sum(\lfloor \frac{N}{d} \rfloor) * sum(\lfloor \frac{M}{d} \rfloor)
\]
分块计算
复杂度\(O(T\sqrt{N} + N\sqrt{N})\)
#include<iostream>
#include<cmath>
#include<cstdio>
#include<cstring>
#include<algorithm>
#define LL long long int
#define REP(i,n) for (int i = 1; i <= (n); i++)
#define Redge(u) for (int k = h[u],to; k; k = ed[k].nxt)
#define BUG(s,n) for (int i = 1; i <= (n); i++) cout<<s[i]<<' '; puts("");
using namespace std;
const int maxn = 50005,maxm = 100005,INF = 1000000000;
inline int read(){
int out = 0,flag = 1; char c = getchar();
while (c < 48 || c > 57) {if (c == '-') flag = -1; c = getchar();}
while (c >= 48 && c <= 57) {out = (out << 3) + (out << 1) + c - '0'; c = getchar();}
return out * flag;
}
int prime[maxn],primei,mu[maxn],isn[maxn];
LL sum[maxn];
void init(){
mu[1] = 1;
for (int i = 2; i < maxn; i++){
if (!isn[i]) prime[++primei] = i,mu[i] = -1;
for (int j = 1; j <= primei && i * prime[j] < maxn; j++){
isn[i * prime[j]] = true;
if (i % prime[j] == 0){mu[i * prime[j]] = 0; break;}
mu[i * prime[j]] = -mu[i];
}
}
for (int i = 1; i < maxn; i++) mu[i] += mu[i - 1];
for (int n = 1,nxt; n <= 50000; n++){
for (int i = 1; i <= n; i = nxt + 1){
nxt = n / (n / i);
sum[n] += (LL)(nxt - i + 1) * (n / i);
}
}
}
int main(){
init();
int T = read(),n,m;
while (T--){
n = read(); m = read();
if (n > m) swap(n,m);
LL ans = 0; int nxt;
for (int i = 1; i <= n; i = nxt + 1){
nxt = min(n / (n / i),m / (m / i));
ans += sum[n / i] * sum[m / i] * (mu[nxt] - mu[i - 1]);
}
printf("%lld\n",ans);
}
return 0;
}
