The xor-longest Path

Time Limit: 2000MS Memory Limit: 65536K

Total Submissions: 6455 Accepted: 1392

Description

In an edge-weighted tree, the xor-length of a path p is defined as the xor sum of the weights of edges on p:

{xor}length(p)=\oplus{e \in p}w(e)

⊕ is the xor operator.

We say a path the xor-longest path if it has the largest xor-length. Given an edge-weighted tree with n nodes, can you find the xor-longest path? 　

Input

The input contains several test cases. The first line of each test case contains an integer n(1<=n<=100000), The following n-1 lines each contains three integers u(0 <= u < n),v(0 <= v < n),w(0 <= w < 2^31), which means there is an edge between node u and v of length w.

Output

For each test case output the xor-length of the xor-longest path.

Sample Input

4

0 1 3

1 2 4

1 3 6

Sample Output

7

Hint

The xor-longest path is 0->1->2, which has length 7 (=3 ⊕ 4)

/*

Trie树+异或+贪心.

异或性质 a^b=(a^c)^(b^c).

首先dfs出根节点到每个节点的xor.

然后a^b=(a^root)^(b^root).

拆成二进制挂在Trie树上跑.

从高位到低位存

贪心此位为1则看0是否存在

正确性显然.

*/

#include<iostream>

#include<cstdio>

#include<cstring>

#define MAXN 100001

using namespace std;

int n,m,dis[MAXN],fa[MAXN],ans,cut,tot,head[MAXN],s[MAXN];

struct edge{int v,next,x;}e[MAXN*2];

struct data{int next[2];}tree[MAXN*16];

inline int read()

{

    int x=0,f=1;char ch=getchar();

    while(ch<'0'||ch>'9'){if(ch=='-')f=-1;ch=getchar();}

    while(ch>='0'&&ch<='9') x=x*10+ch-48,ch=getchar();

    return x*f;

}

void add(int u,int v,int x)

{

    e[++cut].v=v;

    e[cut].x=x;

    e[cut].next=head[u];

    head[u]=cut;

}

void add(int x)

{

    int now=0,xx;

    for(int i=30;i>=0;i--)

    {

        if(x&(1<<i)) xx=1;

        else xx=0;

        if(!tree[now].next[xx]) tot++,tree[now].next[xx]=tot;

        now=tree[now].next[xx];

    }

}

int query(int x)

{

    int now=0,xx,num=0;

    for(int i=30;i>=0;i--)

    {

        if(x&(1<<i)) xx=0;

        else xx=1;

        if(tree[now].next[xx])

        {

            num|=(1<<i);

            now=tree[now].next[xx];

        }

        else now=tree[now].next[!xx];

    }

    return num;

}

void dfs(int u,int f,int xo)

{

    fa[u]=f;s[u]=xo;

    for(int i=head[u];i;i=e[i].next)

    {

        int v=e[i].v;

        if(!fa[v]&&v!=f) dfs(v,u,xo^e[i].x);

    }

}

int main()

{

    int x,y,z;

    while(~scanf("%d",&n))

    {

        ans=0;cut=0;tot=0;

        memset(head,0,sizeof head);

        memset(fa,0,sizeof fa);

        memset(tree,0,sizeof tree);

        for(int i=1;i<=n-1;i++)

        {

            x=read(),y=read(),z=read();

            x++,y++;

            add(x,y,z),add(y,x,z);

        }

        dfs(1,1,0);

        for(int i=1;i<=n;i++) add(s[i]);

        for(int i=1;i<=n;i++) ans=max(ans,query(s[i]));

        printf("%d\n",ans);

    }

    return 0;

}