http://www.lydsy.com/JudgeOnline/problem.php?id=3834
题意:求$max\{(i,j)\}, smin<=i<=smax, wmin<=i<=wmax$,其中$smin<=smax<=10^9, wmin<=wmax<=10^9$,有$N<=1000$组数据
#include <bits/stdc++.h>
using namespace std;
int main() {
int cs, smin, smax, wmin, wmax, ans; scanf("%d", &cs);
while(cs--) {
scanf("%d%d%d%d", &smin, &smax, &wmin, &wmax);
if(smax>wmax) swap(smin, wmin), swap(smax, wmax);
ans=1;
if(wmin<=smax && smax<=wmax) ans=smax;
else {
--smin; --wmin;
for(int d=smax, pos; d; d=pos) {
pos=max(smax/(smax/d+1), wmax/(wmax/d+1));
if(smin>=d) pos=max(pos, smin/(smin/d+1));
if(wmin>=d) pos=max(pos, wmin/(wmin/d+1));
if(smax/d-smin/d>0 && wmax/d-wmin/d>0) { ans=d; break; }
}
}
printf("%d\n", ans);
}
return 0;
}
假设$smax<=wmax$
如果$wmin<=smax<=wmax$,显然答案就是$smax$
考虑枚举$d=gcd$,那么转换为在区间$[ \lfloor \frac{smin}{d} \rfloor, \lfloor \frac{smax}{d} \rfloor ] 和 [ \lfloor \frac{wmin}{d} \rfloor, \lfloor \frac{wmax}{d} \rfloor ]$找$[(i, j)]=1$表示存在$gcd(i,j)=d$
于是我就很sb了............我为什么一定要$[(i,j)]=1$呢.............然后膜拜了zyf千古神犇....发现其实$[(i,j)]>=1$就行了= =.............因为我很sb没想到.......倍数关系啊= =
于是分块查询即可..
复杂度$O(N4\sqrt{smax})$