[BZOJ2154]Crash的数字表格

题目大意：
　　给定$n,m(n,mleq10^7)$，求$displaystylesum_{x=1}^nsum_{y=1}^m{ m lcm}(x,y)$。

思路：
　　令$d=gcd(x,y),x=ad,y=bd$，则：
$$
egin{align*}
原式&=sum_{d=1}^{min(n,m)}dsum_{a=1}^{lfloorfrac{n}{d} floor}sum_{b=1}^{lfloorfrac{m}{d} floor}ab[gcd(ab)=1]\
&=sum_{d=1}^{min(n,m)}dsum_{a=1}^{lfloorfrac{n}{d} floor}sum_{b=1}^{lfloorfrac{m}{d} floor}absum_{p|gcd(a,b)}mu(p)
end{align*}
$$
　　令$p=gcd(a,b),a=jp,b=kp$，则：
$$
egin{align*}
原式&=sum_{d=1}^{min(n,m)}dsum_{p=1}^{min(lfloorfrac{n}{d} floor,lfloorfrac{m}{d} floor)}mu(p)p^2sum_{j=1}^{lfloorfrac{n}{dp} floor}sum_{k=1}^{lfloorfrac{m}{dp} floor}jk\
&=sum_{d=1}^{min(n,m)}dsum_{p=1}^{min(lfloorfrac{n}{d} floor,lfloorfrac{m}{d} floor)}mu(p)p^2frac{(lfloorfrac{n}{dp} floor+1)lfloorfrac{n}{dp} floor}{2}cdotfrac{(lfloorfrac{m}{dp} floor+1)lfloorfrac{m}{dp} floor}{2}\
end{align*}
$$
　　预处理$mu(p)p^2$的前缀和，暴力枚举$d$。对于$lfloorfrac{n}{dp} floor$和$lfloorfrac{m}{dp} floor$分别相等的$p$可以分块计算。

 1 #include<cstdio>
 2 #include<cctype>
 3 #include<algorithm>
 4 typedef long long int64;
 5 inline int getint() {
 6     register char ch;
 7     while(!isdigit(ch=getchar()));
 8     register int x=ch^'0';
 9     while(isdigit(ch=getchar())) x=(((x<<2)+x)<<1)+(ch^'0');
10     return x;
11 }
12 const int N=10000001,M=664580,mod=20101009;
13 bool vis[N];
14 int mu[N],p[M],sum[N];
15 inline void sieve(const int lim) {
16     mu[1]=1;
17     for(register int i=2;i<=lim;i++) {
18         if(!vis[i]) {
19             p[++p[0]]=i;
20             mu[i]=-1;
21         }
22         for(register int j=1;j<=p[0]&&i*p[j]<=lim;j++) {
23             vis[i*p[j]]=true;
24             if(i%p[j]==0) {
25                 mu[i*p[j]]=0;
26                 break;
27             }
28             mu[i*p[j]]=-mu[i];
29         }
30     }
31     for(register int i=1;i<=lim;i++) {
32         sum[i]=(sum[i-1]+(int64)mu[i]*i%mod*i%mod)%mod;
33     }
34 }
35 int main() {
36     const int n=getint(),m=getint(),lim=std::min(n,m);
37     sieve(lim);
38     int ans=0;
39     for(register int d=1;d<=lim;d++) {
40         int tmp=0;
41         const int x=n/d,y=m/d,lim=std::min(x,y);
42         for(register int i=1,j;i<=lim;i=j+1) {
43             j=std::min(x/(x/i),y/(y/i));
44             (tmp+=(sum[j]-sum[i-1]+mod)%mod*((int64)(x/i+1)*(x/i)/2%mod)%mod*((int64)(y/i+1)*(y/i)/2%mod)%mod)%=mod;
45         }
46         (ans+=((int64)tmp*d)%mod)%=mod;
47     }
48     printf("%d
",ans);
49     return 0;
50 }