题面
设(a)的递推公式为
[a_i=sum_ja_jb[count(ioplus j)]
]
其中(oplus)为异或,(count(i))表示(i)的二进制中(1)的个数
给出(a_0,b),求(a_t),(tleq 10^{18})
题解
如果我们定义(c_i=b[count(i)])
这显然就是个异或卷积了……因为要卷(t)次,所以点值表示乘起来的时候要把(c_i)快速幂一下
然而有个尴尬的问题就是这里的模数可能是偶数……那么我们(IDFT)的时候(2)显然没有逆元啊……
解决方法是把模数乘上(lim)(即(fwt)的数组长度),那么最后(IDFT)之后把所有数对(lim)下去整就行了
记得得用快速乘
//minamoto
#include<bits/stdc++.h>
#define R register
#define ll long long
#define dd long double
#define fp(i,a,b) for(R int i=(a),I=(b)+1;i<I;++i)
#define fd(i,a,b) for(R int i=(a),I=(b)-1;i>I;--i)
#define go(u) for(int i=head[u],v=e[i].v;i;i=e[i].nx,v=e[i].v)
using namespace std;
char buf[1<<21],*p1=buf,*p2=buf;
inline char getc(){return p1==p2&&(p2=(p1=buf)+fread(buf,1,1<<21,stdin),p1==p2)?EOF:*p1++;}
int read(){
R int res,f=1;R char ch;
while((ch=getc())>'9'||ch<'0')(ch=='-')&&(f=-1);
for(res=ch-'0';(ch=getc())>='0'&&ch<='9';res=res*10+ch-'0');
return res*f;
}
ll readll(){
R ll res,f=1;R char ch;
while((ch=getc())>'9'||ch<'0')(ch=='-')&&(f=-1);
for(res=ch-'0';(ch=getc())>='0'&&ch<='9';res=res*10+ch-'0');
return res*f;
}
const int N=(1<<20)+5;
ll P;
inline ll add(R ll x,R ll y){return x+y>=P?x+y-P:x+y;}
inline ll dec(R ll x,R ll y){return x-y<0?x-y+P:x-y;}
inline ll mul(R ll x,R ll y){return x*y-(ll)((dd)x/P*y)*P;}
inline ll ksm(R ll x,R ll y){
ll res=1;
for(;y;y>>=1,x=mul(x,x))y&1?res=mul(res,x):0;
return res;
}
void Fwt(ll *A,int lim,int ty){
ll t;
for(R int mid=1;mid<lim;mid<<=1)
for(R int j=0;j<lim;j+=(mid<<1))
fp(k,0,mid-1)
A[j+k+mid]=dec(A[j+k],t=A[j+k+mid]),
A[j+k]=add(A[j+k],t);
if(!ty)fp(i,0,lim-1)A[i]/=lim;
}
int n,lim;ll t,a[N],c[N],sz[N],b[25];
int main(){
n=read(),t=readll(),P=read(),lim=(1<<n),P*=lim;
fp(i,0,lim-1)a[i]=read()%P;fp(i,0,n)b[i]=read()%P;
fp(i,0,lim-1)c[i]=b[sz[i]=sz[i>>1]+(i&1)];
Fwt(a,lim,1),Fwt(c,lim,1);
fp(i,0,lim-1)a[i]=mul(a[i],ksm(c[i],t));
Fwt(a,lim,0);
fp(i,0,lim-1)printf("%I64d
",a[i]);
return 0;
}