描述
Profess X is an expert in signal processing. He has a device which can send a particular 1 second signal repeatedly. The signal is A0 ... An-1 under n Hz sampling.
One day, the device fell on the ground accidentally. Profess X wanted to check whether the device can still work properly. So he ran another n Hz sampling to the fallen device and got B0 ... Bn-1.
To compare two periodic signals, Profess X define the DIFFERENCE of signal A and B as follow:
You may assume that two signals are the same if their DIFFERENCE is small enough.
Profess X is too busy to calculate this value. So the calculation is on you.
题解:
A[]的平方和 与 B[]的平方和可以直接求出。所以只要求出
的最大值即可得到答案。
即求A[]与B[]的循环卷积。 FFT求解。
注意由于数据较大,FFT会出现精度问题。最后结果会有浮点精度误差,但是由结果得到的 k 是正确的,所以一个无赖的办法是根据FFT 的结果求 K,然后再自己算一遍得到最后答案。
注:题解的标准做法是找两个 10910^9109 左右模数 NTT 后 CRT 。
#include <algorithm>
#include <cstring>
#include <string.h>
#include <iostream>
#include <list>
#include <map>
#include <set>
#include <stack>
#include <string>
#include <utility>
#include <vector>
#include <cstdio>
#include <cmath> #define LL long long
#define N 60005
#define INF 0x3ffffff using namespace std; const long double PI = acos(-1.0); struct Complex // 复数
{
long double r,i;
Complex(long double _r = ,long double _i = )
{
r = _r; i = _i;
}
Complex operator +(const Complex &b)
{
return Complex(r+b.r,i+b.i);
}
Complex operator -(const Complex &b)
{
return Complex(r-b.r,i-b.i);
}
Complex operator *(const Complex &b)
{
return Complex(r*b.r-i*b.i,r*b.i+i*b.r);
}
}; void change(Complex y[],int len) // 二进制平摊反转置换 O(logn)
{
int i,j,k;
for(i = , j = len/;i < len-;i++)
{
if(i < j)swap(y[i],y[j]);
k = len/;
while( j >= k)
{
j -= k;
k /= ;
}
if(j < k)j += k;
}
}
void fft(Complex y[],int len,int on) //DFT和FFT
{
change(y,len);
for(int h = ;h <= len;h <<= )
{
Complex wn(cos(-on**PI/h),sin(-on**PI/h));
for(int j = ;j < len;j += h)
{
Complex w(,);
for(int k = j;k < j+h/;k++)
{
Complex u = y[k];
Complex t = w*y[k+h/];
y[k] = u+t;
y[k+h/] = u-t;
w = w*wn;
}
}
}
if(on == -)
for(int i = ;i < len;i++)
y[i].r /= len;
} const int MAXN = ; Complex x1[MAXN],x2[MAXN];
LL a[MAXN/],b[MAXN/]; //原数组
long long num[MAXN]; //FFT结果
void init(){
memset(num,,sizeof(num));
memset(x1,,sizeof(x1));
memset(x2,,sizeof(x2));
} int main()
{
int T;
scanf("%d",&T);
LL suma,sumb;
while(T--)
{
int n;
suma=;sumb=;
init();
scanf("%d",&n);
for(int i = ;i < n;i++) {scanf("%lld",&a[i]);suma+=a[i]*a[i];}
for(int i = ;i < n;i++) {scanf("%lld",&b[i]);sumb+=b[i]*b[i];}
int len = ;
while( len < *n ) len <<= ;
for(int i = ;i < n;i++){
x1[i] = Complex(a[i],);
}
for(int i = ;i < n;i++){
x2[i] = Complex(b[n-i-],);
}
// for(int i=n;i<len;i++) x1[i]=Complex(0,0);
fft(x1,len,);fft(x2,len,);
for(int i = ;i < len;i++){
x1[i] = x1[i]*x2[i];
}
fft(x1,len,-);
for(int i = ;i < len;i++){
num[i] = (LL)(x1[i].r+0.5);
}
// for(int i = 0;i < len;i++) cout<<num[i]<<endl;
LL ret=num[n-];
int flag=;
// cout<<ret<<endl;
for(int i=;i<n-;i++) {
// cout<<num[i]+num[i+n]<<endl;
if(ret<num[i]+num[i+n])
{ret=num[i]+num[i+n]; flag=n--i;}
//注意,此时得到的ret会有很小的浮点精度误差,
//flag表示k,这个是正确的
}
ret=;
for(int i=;i<n;i++){
ret+=a[i]*b[(i+flag)%n]; //重新算一遍得到最后答案
}
LL ans=suma+sumb-*ret;
cout<< ans<<endl;
}
return ;
}