题意:有N种物品,每种物品有价值\(a_i\),每种物品可选任意多个,求拿k件物品,可能损失的价值分别为多少。
分析:相当于求\((a_1+a_2+...+a_n)^k\)中,有哪些项的系数不为0.做k次FFT求卷积求卷积肯定爆炸,考虑用分治的形式计算,因为中间计算的时候会重复计算一些幂次,所以用记忆化搜索的形式,保留计算结果。
因为只要计算出哪些项不为0,所以卷积之后求结果时,系数非0项用1作系数即可,否则分分钟炸精度。
当然也可以用快速幂求解#.
#include <bits/stdc++.h>
using namespace std;
typedef long long LL;
const int MAXN = 2e6 + 10;
const double PI = acos(-1.0);
struct Complex{
double x, y;
inline Complex operator+(const Complex b) const {
return (Complex){x +b.x,y + b.y};
}
inline Complex operator-(const Complex b) const {
return (Complex){x -b.x,y - b.y};
}
inline Complex operator*(const Complex b) const {
return (Complex){x *b.x -y * b.y,x * b.y + y * b.x};
}
} va[MAXN * 2 + MAXN / 2], vb[MAXN * 2 + MAXN / 2];
int lenth = 1, rev[MAXN * 2 + MAXN / 2];
int N, M; // f 和 g 的数量
// f g和 的系数
// 卷积结果
// 大数乘积
int f[MAXN],g[MAXN];
vector<LL> conv;
vector<LL> multi;
//f g
void init()
{
int tim = 0;
lenth = 1;
conv.clear(), multi.clear();
memset(va, 0, sizeof va);
memset(vb, 0, sizeof vb);
while (lenth <= N + M - 2)
lenth <<= 1, tim++;
for (int i = 0; i < lenth; i++)
rev[i] = (rev[i >> 1] >> 1) + ((i & 1) << (tim - 1));
}
void FFT(Complex *A, const int fla)
{
for (int i = 0; i < lenth; i++){
if (i < rev[i]){
swap(A[i], A[rev[i]]);
}
}
for (int i = 1; i < lenth; i <<= 1){
const Complex w = (Complex){cos(PI / i), fla * sin(PI / i)};
for (int j = 0; j < lenth; j += (i << 1)){
Complex K = (Complex){1, 0};
for (int k = 0; k < i; k++, K = K * w){
const Complex x = A[j + k], y = K * A[j + k + i];
A[j + k] = x + y;
A[j + k + i] = x - y;
}
}
}
}
void getConv(){ //求多项式
init();
for (int i = 0; i < N; i++)
va[i].x = f[i];
for (int i = 0; i < M; i++)
vb[i].x = g[i];
FFT(va, 1), FFT(vb, 1);
for (int i = 0; i < lenth; i++)
va[i] = va[i] * vb[i];
FFT(va, -1);
for (int i = 0; i <= N + M - 2; i++)
conv.push_back((LL)(va[i].x / lenth + 0.5)>0?1:0);
}
int base[MAXN];
vector<LL> mi[1005];
int num;
bool make[1005];
vector<LL> dfs(int i,int j,int cc){
if(i==j){
vector<LL> res;
for(int i=0;i<num;++i){
res.push_back(base[i]);
}
make[cc] = true;
mi[cc] = res;
return res;
}
vector<LL> L,R;
int m = (i+j)>>1;
if(make[m-i+1]) L = mi[m-i+1];
else L = dfs(i,m,m-i+1);
if(make[j-m]) R = mi[j-m];
else R = dfs(m+1,j,j-m);
N = L.size();
M = R.size();
for(int i=0;i<N;++i) f[i] = L[i];
for(int i=0;i<M;++i) g[i] = R[i];
getConv();
make[cc] = true;
mi[cc] = conv;
return conv;
}
int cnt[MAXN];
int main()
{
int n,k;
scanf("%d %d",&n, &k);
int mx = -1;
int mn = 100005;
for(int i=1,tmp;i<=n;++i){
scanf("%d",&tmp);
cnt[tmp]++;
mn = min(mn,tmp);
mx = max(mx,tmp);
}
num = mx+1;
for(int i=0;i<num;++i){
base[i] = cnt[i];
}
conv = dfs(1,k,k);
int sz = conv.size();
for(int i=k*mn;i<sz;++i){
if(!conv[i]) continue;
printf("%d%c",i,i==sz-1?'\n':' ');
}
return 0;
}