meet in the middle
https://www.luogu.org/problem/P4799
下面引出主角——折半搜索(meet in the middle思想)
因为N≤40 O(240)的爆搜一定会TLE,所以我们将N分成两份
搜索11到n/2和n/2+1到n,让复杂度降到O(2n/2+1+组合答案的复杂度))。
画一个图(网上找的不错的图)理解一下为什么能降低复杂度
分析:
双向搜索往往也用来解决这种N等于三四十的搜索问题
code by std:
#include<iostream>
#include<algorithm>
#include<cstdio>
#include<cstring>
#include<cctype>
#define ll long long
#define R register
#define N 55
using namespace std;
template<typename T>inline void read(T &a){
char c=getchar();T x=0,f=1;
while(!isdigit(c)){if(c=='-')f=-1;c=getchar();}
while(isdigit(c)){x=(x<<1)+(x<<3)+c-'0';c=getchar();}
a=f*x;
}
ll n,m,w[N],mid,suma[1<<21],sumb[1<<21],cnta,cntb,ans;
inline void dfs(R int l,R int r,R ll sum,R ll a[],R ll &cnt){
if(sum>m)return;
if(l>r){
a[++cnt]=sum;
return;
}
dfs(l+1,r,sum+w[l],a,cnt);
dfs(l+1,r,sum,a,cnt);
}
int main(){
read(n);read(m);
for(R int i=1;i<=n;i++)read(w[i]);
mid=n>>1;
dfs(1,mid,0,suma,cnta);
dfs(mid+1,n,0,sumb,cntb);
sort(suma+1,suma+1+cnta);
for(R int i=1;i<=cntb;i++)
ans+=upper_bound(suma+1,suma+1+cnta,m-sumb[i])-suma-1;
printf("%lld
",ans);
return 0;
}