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A:容易发现这要求所有子集中元素的最高位1的位置相同,并且满足这个条件也是一定合法的。统计一下即可。
#include<iostream> #include<cstdio> #include<cmath> #include<cstdlib> #include<cstring> #include<algorithm> using namespace std; int read() { int x=0,f=1;char c=getchar(); while (c<'0'||c>'9') {if (c=='-') f=-1;c=getchar();} while (c>='0'&&c<='9') x=(x<<1)+(x<<3)+(c^48),c=getchar(); return x*f; } #define N 1010 int n,cnt[40]; int main() { freopen("subset.in","r",stdin); freopen("subset.out","w",stdout); while (scanf("%d",&n)>0) { memset(cnt,0,sizeof(cnt)); for (int i=1;i<=n;i++) { int x=read(); for (int j=30;~j;j--) if (x&(1<<j)) {cnt[j]++;break;} } for (int i=1;i<31;i++) cnt[0]=max(cnt[0],cnt[i]); printf("%d\n",cnt[0]); } return 0; }
B:考虑暴力dp,令f[i]为到达第i个咖啡站所花费的最短时间,枚举上次买咖啡的地点转移。可以发现这里转移分三种情况:咖啡未冷却(事实上这一种似乎没有必要转移);咖啡已冷却而未喝完;咖啡未喝完。每种转移都是一段连续的区间,可以二分找到分界点线段树暴力查询。进一步发现每次分界点单调递增,只需要维护两个指针即可。这样就可以改为用单调队列优化了,然而感觉很容易写挂还是搞了一棵线段树,卡进0.5s感觉非常稳。
#include<iostream> #include<cstdio> #include<cmath> #include<cstdlib> #include<cstring> #include<algorithm> using namespace std; #define N 500010 #define ll long long #define inf 1000000000000 ll read() { ll x=0,f=1;char c=getchar(); while (c<'0'||c>'9') {if (c=='-') f=-1;c=getchar();} while (c>='0'&&c<='9') x=(x<<1)+(x<<3)+(c^48),c=getchar(); return x*f; } ll l,d[N]; double f[N],mn[N],ans,tree[N<<2],c[N],e[N],u,v; int n,a,b,t,r,L[N<<2],R[N<<2],Q[N]; double calc(ll x) { if (x<=t*a) return (double)x/a; if (x<=t*a+r*b) return (double)(x-t*a)/b+t; return (double)(x-r*b)/a+r; } void build(int k,int l,int r) { L[k]=l,R[k]=r;tree[k]=inf; if (l==r) return; int mid=l+r>>1; build(k<<1,l,mid); build(k<<1|1,mid+1,r); } double query(int k,int l,int r) { if (l>r) return inf; if (L[k]==l&&R[k]==r) return tree[k]; int mid=L[k]+R[k]>>1; if (r<=mid) return query(k<<1,l,r); else if (l>mid) return query(k<<1|1,l,r); else return min(query(k<<1,l,mid),query(k<<1|1,mid+1,r)); } void ins(int k,int p,double x) { if (L[k]==R[k]) {tree[k]=x;return;} int mid=L[k]+R[k]>>1; if (p<=mid) ins(k<<1,p,x); else ins(k<<1|1,p,x); tree[k]=min(tree[k<<1],tree[k<<1|1]); } int main() { freopen("walk.in","r",stdin); freopen("walk.out","w",stdout); cin>>l>>a>>b>>t>>r; n=read(); for (int i=1;i<=n;i++) d[i]=read(),c[i]=(double)d[i]/a,e[i]=(double)d[i]/b; mn[0]=inf;ans=(double)l/a;if (n==0) {printf("%.7lf",ans);return 0;} build(1,1,n); int p=1,q=1,head=0,tail=0; double u=t*(1-(double)a/b),v=r*(1-(double)b/a); for (int i=1;i<=n;i++) { f[i]=c[i]; while (d[p]<d[i]-t*a) p++; while (d[q]<d[i]-t*a-r*b) q++; while (head<=tail&&Q[head]<p) head++; f[i]=min(f[i],f[Q[head]]-c[Q[head]]+c[i]); f[i]=min(f[i],query(1,q,p-1)+e[i]+u); f[i]=min(f[i],mn[q-1]+c[i]+v); mn[i]=min(mn[i-1],f[i]-c[i]); while (head<=tail&&f[i]-c[i]<=f[Q[tail]]-c[Q[tail]]) tail--; Q[++tail]=i; ins(1,i,f[i]-e[i]); ans=min(ans,f[i]+calc(l-d[i])); } printf("%.7lf",ans); return 0; }
C:每次相邻交换可以且最多减少一个逆序对。算出逆序对个数剩下的怎么搞都行了。
#include<iostream> #include<cstdio> #include<cmath> #include<cstdlib> #include<cstring> #include<algorithm> using namespace std; int read() { int x=0,f=1;char c=getchar(); while (c<'0'||c>'9') {if (c=='-') f=-1;c=getchar();} while (c>='0'&&c<='9') x=(x<<1)+(x<<3)+(c^48),c=getchar(); return x*f; } #define N 50010 #define ll long long int n,a[N],tree[N]; ll m,B; int query(int k){int s=0;while (k) s+=tree[k],k-=k&-k;return s;} void ins(int k){while (k<=n) tree[k]++,k+=k&-k;} int main() { freopen("game.in","r",stdin); freopen("game.out","w",stdout); n=read();cin>>B; for (int i=1;i<=n;i++) { a[i]=read(); m+=i-query(a[i])-1; ins(a[i]); } if (B>m) cout<<m*(m+1)/2; else cout<<B*(B+1)/2+(m-B)*B; return 0; }
result:300 rank1
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