开始写的时候是用的O(n*(logn)^2)的复杂度,枚举起点二分最远能到多远然后累加长度就是答案,但是这样TLE了,最后直接在树上二分完事。
这里顺序是倒着来的,因为这个写法是查最右点,是为了妥协不能区间减法而固定最左点的,所以去右子树的话一定要带上左子树的状态去递归。回来之后还要再max一下,因为有左子树保底。
这题交G++跑1000MS+,但据说数据乱搞直接平方级暴力可以100MS+……
/*
Author : Speedcell
Update : 2013-05-30
Version : soppYcell 2.2(a)
*/
#include <algorithm>
#include <iostream>
#include <fstream>
#include <sstream>
#include <iomanip>
#include <map>
#include <set>
#include <list>
#include <stack>
#include <queue>
#include <deque>
#include <vector>
#include <string>
#include <bitset>
#include <memory>
#include <complex>
#include <numeric>
#include <stdio.h>
#include <stdlib.h>
#include <string.h>
#include <math.h>
#include <time.h>
#include <ctype.h>
#include <locale.h>
using namespace std;
#pragma pack(4)
#ifndef __CONSTANT__
#define __CONSTANT__
typedef long long LONG;
const double pi = acos(-1.0);
const int inf = 0x7f7f7f7f;
const LONG INF = 0x7f7f7f7f7f7f7f7fll;
const int go[8][2] = {{0,1},{0,-1},{1,0},{-1,0},{1,1},{1,-1},{-1,1},{-1,-1}};
#endif // __CONSTANT__
#ifndef __IO__
#define __IO__
inline bool RD(int & a) {return scanf("%d",&a)!=EOF;}
inline bool RD(char & a) {return scanf("%c",&a)!=EOF;}
inline bool RD(char * a) {return scanf("%s", a)!=EOF;}
inline bool RD(double & a) {return scanf("%lf",&a)!=EOF;}
inline bool RD(LONG & a) {return scanf("%I64d",&a)!=EOF;}
template<class T1> inline bool
IN(T1 & a) {return RD(a);}
template<class T1,class T2> inline bool
IN(T1 & a,T2 & b) {return RD(a)&&RD(b);}
template<class T1,class T2,class T3> inline bool
IN(T1 & a,T2 & b,T3 & c) {return RD(a)&&RD(b)&&RD(c);}
template<class T1,class T2,class T3,class T4> inline bool
IN(T1 & a,T2 & b,T3 & c,T4 & d) {return RD(a)&&RD(b)&&RD(c)&&RD(d);}
template<class T1,class T2,class T3,class T4,class T5> inline bool
IN(T1 & a,T2 & b,T3 & c,T4 & d,T5 & e) {return RD(a)&&RD(b)&&RD(c)&&RD(d)&&RD(e);}
template<class T1,class T2,class T3,class T4,class T5,class T6> inline bool
IN(T1 & a,T2 & b,T3 & c,T4 & d,T5 & e,T6 & f) {return RD(a)&&RD(b)&&RD(c)&&RD(d)&&RD(e)&&RD(f);}
template<class T1,class T2,class T3,class T4,class T5,class T6,class T7> inline bool
IN(T1 & a,T2 & b,T3 & c,T4 & d,T5 & e,T6 & f,T7 & g) {return RD(a)&&RD(b)&&RD(c)&&RD(d)&&RD(e)&&RD(f)&&RD(g);}
inline void PT(int a) {printf("%d",a);}
inline void PT(char a) {printf("%c",a);}
inline void PT(char * a) {printf("%s",a);}
inline void PT(double a) {printf("%f",a);}
inline void PT(LONG a) {printf("%I64d",a);}
inline void PT(const char a[]) {printf("%s",a);}
template<class T1> inline void
OT(T1 a) {PT(a);}
template<class T1,class T2> inline void
OT(T1 a,T2 b) {PT(a),PT(' '),PT(b);}
template<class T1,class T2,class T3> inline void
OT(T1 a,T2 b,T3 c) {PT(a),PT(' '),PT(b),PT(' '),PT(c);}
template<class T1,class T2,class T3,class T4> inline void
OT(T1 a,T2 b,T3 c,T4 d) {PT(a),PT(' '),PT(b),PT(' '),PT(c),PT(' '),PT(d);}
template<class T1,class T2,class T3,class T4,class T5> inline void
OT(T1 a,T2 b,T3 c,T4 d,T5 e) {PT(a),PT(' '),PT(b),PT(' '),PT(c),PT(' '),PT(d),PT(' '),PT(e);}
template<class T1,class T2,class T3,class T4,class T5,class T6> inline void
OT(T1 a,T2 b,T3 c,T4 d,T5 e,T6 f) {PT(a),PT(' '),PT(b),PT(' '),PT(c),PT(' '),PT(d),PT(' '),PT(e),PT(' '),PT(f);}
template<class T1,class T2,class T3,class T4,class T5,class T6,class T7> inline void
OT(T1 a,T2 b,T3 c,T4 d,T5 e,T6 f,T7 g) {PT(a),PT(' '),PT(b),PT(' '),PT(c),PT(' '),PT(d),PT(' '),PT(e),PT(' '),PT(f),PT(' '),PT(g);}
template<class T1> inline void
OL(T1 a) {PT(a),PT('\n');}
template<class T1,class T2> inline void
OL(T1 a,T2 b) {PT(a),PT(' '),PT(b),PT('\n');}
template<class T1,class T2,class T3> inline void
OL(T1 a,T2 b,T3 c) {PT(a),PT(' '),PT(b),PT(' '),PT(c),PT('\n');}
template<class T1,class T2,class T3,class T4> inline void
OL(T1 a,T2 b,T3 c,T4 d) {PT(a),PT(' '),PT(b),PT(' '),PT(c),PT(' '),PT(d),PT('\n');}
template<class T1,class T2,class T3,class T4,class T5> inline void
OL(T1 a,T2 b,T3 c,T4 d,T5 e) {PT(a),PT(' '),PT(b),PT(' '),PT(c),PT(' '),PT(d),PT(' '),PT(e),PT('\n');}
template<class T1,class T2,class T3,class T4,class T5,class T6> inline void
OL(T1 a,T2 b,T3 c,T4 d,T5 e,T6 f) {PT(a),PT(' '),PT(b),PT(' '),PT(c),PT(' '),PT(d),PT(' '),PT(e),PT(' '),PT(f),PT('\n');}
template<class T1,class T2,class T3,class T4,class T5,class T6,class T7> inline void
OL(T1 a,T2 b,T3 c,T4 d,T5 e,T6 f,T7 g) {PT(a),PT(' '),PT(b),PT(' '),PT(c),PT(' '),PT(d),PT(' '),PT(e),PT(' '),PT(f),PT(' '),PT(g),PT('\n');}
#endif // __IO__
#ifndef __MACRO__
#define __MACRO__
#define ML(times) int tcase; IN(tcase); FOR(times,1,tcase)
#define FOR(i,a,b) for(int i=int(a),_##i=int(b);i<=_##i;i++)
#define DWN(i,b,a) for(int i=int(b),_##i=int(a);_##i<=i;i--)
#define ECH(i,u,pre,next) for(int i=int(pre[u]);i!=-1;i=int(next[i]))
#define MEM(a,v) memset(a,v,sizeof(a))
#define CLR(a,v) FOR(_i##a,0,sizeof(a)/sizeof(a[0])-1) a[_i##a]=v
#define LOOP(a,n) \
FOR(_i##a,0,(n)-1) \
OT(a[_i##a]),OT(_i##a!=__i##a?' ':'\n')
#define LOOP2(a,n,m) \
FOR(_i##a,0,(n)-1) FOR(_j##a,0,(m)-1) \
OT(a[_i##a][_j##a]),OT(_j##a!=__j##a?' ':'\n')
#define LOOPG(G,n,pre,next) \
FOR(_i##a,0,(n)-1) ECH(_j##a,_i##a,pre,next) \
OL(_i##a,G[_j##a].v,G[_j##a].w)
#endif // __MACRO__
#ifndef __BIT__
#define __BIT__
template<class T> inline T lb(T i) {return i&-i;}
template<class T> inline T lc(T i) {return i<<1;}
template<class T> inline T rc(T i) {return i<<1|1;}
template<class T> inline T at(T a,int i) {return a& (T(1)<<i);}
template<class T> inline T nt(T a,int i) {return a^ (T(1)<<i);}
template<class T> inline T s1(T a,int i) {return a| (T(1)<<i);}
template<class T> inline T s0(T a,int i) {return a&~(T(1)<<i);}
#endif // __BIT__
#ifndef __DOUBLE__
#define __DOUBLE__
const double eps = 1e-8;
inline int cmp(double a,double b=0) {return fabs(a-b)<eps?0:((a-b)>eps?+1:-1);}
inline double fmax(double a,double b) {return cmp(a,b)>0?a:b;}
inline double fmin(double a,double b) {return cmp(a,b)<0?a:b;}
#endif // __DOUBLE__
const int MAXV = 100002;
class SegmentTree
{
private:
int L,R,a[MAXV<<2];
#define ls(l,r,i) l,(l+r)>>1,lc(i)
#define rs(l,r,i) ((l+r)>>1)+1,r,rc(i)
void add(int v,int l,int r,int i)
{
if(l<=r) a[i]|=v;
}
void up(int l,int r,int i)
{
if(l<r) a[i]=a[lc(i)]|a[rc(i)];
}
void update(int x,int v,int l,int r,int i)
{
if(x==l&&r==x) add(v,l,r,i);
else
{
if(x<=(l+r)/2) update(x,v,ls(l,r,i));
else update(x,v,rs(l,r,i));
up(l,r,i);
}
}
int query(int v,int now,int l,int r,int i)
{
if(l>r) return -1;
else if((a[i]|now)<v) return r;
else
{
if(l==r) return -1;
else if((a[lc(i)]|now)>=v) return query(v,now,ls(l,r,i));
else return max((l+r)/2,query(v,a[lc(i)]|now,rs(l,r,i)));
}
}
public:
void clear(int l,int r)
{
L=l;
R=r;
MEM(a,0);
}
void update(int x,int v)
{
update(x,v,L,R,1);
}
int query(int x,int v)
{
int ans=query(v,0,L,R,1);
if(ans<x) return 0;
else return ans-x+1;
}
}st;
int n,m,v[MAXV];
int main()
{
#ifndef ONLINE_JUDGE
freopen("A Bit Fun.txt","r",stdin);
#else
#endif
ML(times)
{
IN(n,m);
int ans=0;
st.clear(0,n-1);
FOR(i,0,n-1) IN(v[i]);
DWN(i,n-1,0)
{
st.update(i,v[i]);
ans+=st.query(i,m);
}
printf("Case #%d: %d\n",times,ans);
}
return 0;
}