Description
在N×N的棋盤裏面放K個國王,使他們互不攻擊,共有多少種擺放方案。國王能攻擊到它上下左右,以及左上
左下右上右下八個方向上附近的各一個格子,共8個格子。
Input
只有一行,包含兩個數N,K ( 1 <=N <=9, 0 <= K <= N * N)
Output
方案數。
Sample Input
3 2
Sample Output
16
難度:NOIP
用到的算法:狀壓DP
#include<iostream>
#include<cstdio>
#define ll long long
using namespace std;
const int Maxn=10;
ll n,k;
ll f[Maxn+2][(1<<Maxn)][Maxn*Maxn+2];
ll ans;
ll ok[(1<<Maxn)],s[(1<<Maxn)],cnt,sum[(1<<Maxn)],next[(1<<Maxn)][(1<<Maxn)],nx[(1<<Maxn)];
bool check(ll x1,ll x2){
for(ll i=0;i<n;i++){
if((1<<i)&x1){
if(((1<<(i-1))&x2)||((1<<(i+1))&x2)||((1<<i))&x2){
return 0;
}
}
}
return 1;
}
int main(){
scanf("%lld%lld",&n,&k);
for(ll i=0;i<=(1<<n)-1;i++){
for(ll j=0;j<n;j++){
if((1<<j)&i){
sum[i]++;
if(j&&(((1<<(j-1))&i))){
ok[i]=-1;break;
}
if(((1<<(j+1))&i)){
ok[i]=-1;break;
}
}
}
if(ok[i]==0)s[++cnt]=i,f[1][i][sum[i]]=1;
}
for(ll i=1;i<=cnt;i++){
for(ll j=1;j<=cnt;j++){
if(check(s[i],s[j])){
next[s[i]][++nx[s[i]]]=s[j];
}
}
}
for(ll i=1;i<=n;i++){
for(ll j=1;j<=cnt;j++){
for(ll l=sum[s[j]];l<=k;l++){
if(f[i][s[j]][l]!=0)
for(ll v=1;v<=nx[s[j]];v++){
if(i+1==3&&next[s[j]][v]==4&&l+sum[next[s[j]][v]]==2&&s[j]==0){
f[i+1][next[s[j]][v]][l+sum[next[s[j]][v]]]+=f[i][s[j]][l];
continue;
}
f[i+1][next[s[j]][v]][l+sum[next[s[j]][v]]]+=f[i][s[j]][l];
}
}
}
}
for(ll j=1;j<=cnt;j++){
ans+=f[n][s[j]][k];
}
printf("%lld\n",ans);
return 0;
}