Lcm bzoj-4659 bzoj-2694
题目大意:给出A,B,考虑所有满足l<=a<=A,l<=b<=B,且不存在n>1使得n^2同时整除a和b的有序数对(a,b),求其lcm(a,b)之和。答案模2^30。
注释:$1le A,Ble 4cdot 10^6$,$1le cases le 2000$。
想法:这题是一道挺好的题,它的好在于对于题目的转化。
这题目描述,没个做,我们将它转化一下
$ sumlimits_{i=1}^Asumlimits_{j=1}^Blcm(i,j)mu(gcd(i,j))^2$
这时,就变成了一道反演的题目了。
$=sumlimits_{i=1}^Asumlimits_{j=1}^Bsumlimits_{d|i,d|j}[gcd(i,j)=d]frac{ij}{d}mu(d)^2$
$=sumlimits_{d=1}^Asumlimits_{i=1}^{lfloorfrac{A}{d} floor}sumlimits_{j=1}^{lfloorfrac{B}{d} floor}[gcd(i,j)==1]cdot dij cdot mu(d)^2$
$=sumlimits_{d=1}^{A}mu(d)^2dsumlimits_{i=1}^{lfloorfrac{A}{d} floor}isumlimits_{j=1}^{lfloorfrac{B}{d} floor}jsumlimits_{e|i,e|j}mu(e)$
$=sumlimits_{d=1}^Amu(d)^2dsumlimits_{e=1}^{lfloorfrac{A}{d} floor}mu(e)e^2sumlimits_{i=1}^{lfloorfrac{A}{de} floor}isumlimits_{j=1}^{lfloorfrac{B}{de} floor}j$
$=sumlimits_{D=1}^ADsumlimits_{d|D}mu(d)^2mu(frac{D}{d})frac{D}{d}sum(lfloorfrac{A}{D} floor)sum(lfloorfrac{B}{D} floor)$
此时,我们设函数
$f(x)=sumlimits_{d|x}mu(d)^2mu(frac{x}{d})frac{x}{d}$
$g(x)=mu(x)^2$
$h(x)=xcdotmu(x)$
因为g函数为积性函数,h函数为积性函数,所以函数$gcdot h$为积性函数,故f函数为积性函数,所以我们可以线性筛。
最后,附上丑陋的代码... ...
#include <cstdio>
#include <cstring>
#include <iostream>
using namespace std;
typedef long long ll;
const ll N=4000000;
ll pri[N/10],np[N+10];
ll f[N+10],s[N+10],sum[N+10],ans,msk;
ll num,cases,n,m;
inline char nc()
{
static char buf[100000],*p1,*p2;
return p1==p2&&(p2=(p1=buf)+fread(buf,1,100000,stdin),p1==p2)?EOF:*p1++;
}
inline int read()
{
int x=0;char c=nc();
while(!isdigit(c))c=nc();
while(isdigit(c))x=x*10+c-'0',c=nc();
return x;
}
int main()
{
ll p,last;
f[1]=s[1]=sum[1]=1;
msk=1,msk<<=30,msk--;
for(int i=2;i<=N;i++)
{
if(!np[i]) pri[++num]=i,f[i]=1-i;
s[i]=s[i-1]+f[i]*i,sum[i]=sum[i-1]+i;
for(int j=1;j<=num&&i*pri[j]<=N;j++)
{
p=pri[j],np[i*p]=1;
if(i%p==0)
{
if(i%(p*p)==0) f[i*p]=0;
else f[i*p]=f[i/p]*(-p);
break;
}
f[i*p]=f[i]*(1-p);
}
}
cases=read();
while(cases--)
{
n=read(),m=read(),ans=0;
if(n>m) swap(n,m);
for(int i=1;i<=n;i=last+1)
{
last=min(n/(n/i),m/(m/i));
ans+=(s[last]-s[i-1])*sum[n/i]*sum[m/i];
}
printf("%lld
",ans&msk);
}
return 0;
}
小结:反演好玩qwq...