给定一个由N个整数组成的数组arr [] ,任务是从给定数组中所有可能的对中找到最大的按位XOR。
例子:
Input: arr[] = {25, 10, 2, 8, 5, 3}
Output: 28
Explanation:
The maximum result is 5^25 = 28.
Input: arr[] = {1, 2, 3, 4, 5, 6, 7}
Output: 7
Explanation:
The maximum result is 1^6 = 7.
天真的方法:请参阅文章数组中的两个数的最大异或运算,以解决最简单的方法,方法是生成给定数组的所有对,并计算每个对的异或运算,以找出其中的最大值。
时间复杂度: O(N 2 )
辅助空间: O(1)
位屏蔽方法:请参阅文章“数组中两个数的最大XOR”以使用位屏蔽解决问题。
时间复杂度: O(N * log M),其中M是数组中存在的最大数字
辅助空间: O(N)
高效的方法:上述方法可以通过使用Trie来解决,方法是将数字的二进制表示形式插入数组arr []中。现在迭代数组arr []中所有元素的二进制表示,如果当前位为0,则在Trie中找到值为1的路径,反之亦然,以获取按位XOR的最大值。更新每个数字的最大值。步骤如下:
- 将maximumXOR初始化为0 。
- 在树的给定数组arr []中插入所有数字的二进制表示形式。在插入Trie时,如果当前位0,则在左侧创建一个节点,否则在当前头部节点的右侧创建一个节点。
- 现在,遍历给定的数组,并对每个元素执行以下操作:
- 将currentXOR值初始化为0。
- 遍历当前数字的二进制表示形式。
- 如果第i位是1并且node-> left存在,则将currentXOR更新为currentXOR + pow(2,i),并将node更新为node-> left 。其他更新node = node-> right 。
- 如果第i位为0 ,并且node-> right存在,则将currentXOR更新为currentXOR + pow(2,i),并将node更新为node-> right 。其他更新node = node-> left 。
- 对于上述步骤中的每个数组元素,如果maximumXOR大于currentXOR ,则更新maximumXOR值。
- 完成上述步骤后,输出maximumXOR的值。
下面是上述方法的实现:
C++
// C++ program for the above approach
#include
using namespace std;
// Structure of Trie
class node {
public:
node* left;
node* right;
};
// Function to insert binary
// representation of element x
// in the Trie
void insert(int x, node* head)
{
// Store the head
node* curr = head;
for (int i = 30; i >= 0; i--) {
// Find the i-th bit
int val = (x >> i) & 1;
if (val == 0) {
// If curr->left is NULL
if (!curr->left)
curr->left = new node();
// Update curr to curr->left
curr = curr->left;
}
else {
// If curr->right is NULL
if (!curr->right)
curr->right = new node();
// Update curr to curr->right
curr = curr->right;
}
}
}
// Function that finds the maximum
// Bitwise XOR value for all such pairs
int findMaximumXOR(int arr[], int n)
{
// head Node of Trie
node* head = new node();
// Insert each element in trie
for (int i = 0; i < n; i++) {
insert(arr[i], head);
}
// Stores the maximum XOR value
int ans = 0;
// Traverse the given array
for (int i = 0; i < n; i++) {
// Stores the XOR with current
// value arr[i]
int curr_xor = 0;
int M = pow(2, 30);
node* curr = head;
for (int j = 30; j >= 0; j--) {
// Finding ith bit
int val = (arr[i] >> j) & 1;
// Check if the bit is 0
if (val == 0) {
// If right node exists
if (curr->right) {
// Update the currentXOR
curr_xor += M;
curr = curr->right;
}
else {
curr = curr->left;
}
}
else {
// Check if left node exists
if (curr->left) {
// Update the currentXOR
curr_xor += M;
curr = curr->left;
}
else {
curr = curr->right;
}
}
// Update M to M/2 for next set bit
M /= 2;
}
// Update the maximum XOR
ans = max(ans, curr_xor);
}
// Return the maximum XOR found
return ans;
}
// Driver Code
int main()
{
// Given array arr[]
int arr[] = { 1, 2, 3, 4 };
int N = sizeof(arr) / sizeof(arr[0]);
// Function Call
cout << findMaximumXOR(arr, N);
return 0;
} Java
// Java program for the above approach
import java.util.*;
class GFG{
// Structure of Trie
static class node
{
node left;
node right;
};
// Function to insert binary
// representation of element x
// in the Trie
static void insert(int x, node head)
{
// Store the head
node curr = head;
for(int i = 30; i >= 0; i--)
{
// Find the i-th bit
int val = (x >> i) & 1;
if (val == 0)
{
// If curr.left is null
if (curr.left == null)
curr.left = new node();
// Update curr to curr.left
curr = curr.left;
}
else
{
// If curr.right is null
if (curr.right == null)
curr.right = new node();
// Update curr to curr.right
curr = curr.right;
}
}
}
// Function that finds the maximum
// Bitwise XOR value for all such pairs
static int findMaximumXOR(int arr[], int n)
{
// head Node of Trie
node head = new node();
// Insert each element in trie
for(int i = 0; i < n; i++)
{
insert(arr[i], head);
}
// Stores the maximum XOR value
int ans = 0;
// Traverse the given array
for(int i = 0; i < n; i++)
{
// Stores the XOR with current
// value arr[i]
int curr_xor = 0;
int M = (int)Math.pow(2, 30);
node curr = head;
for(int j = 30; j >= 0; j--)
{
// Finding ith bit
int val = (arr[i] >> j) & 1;
// Check if the bit is 0
if (val == 0)
{
// If right node exists
if (curr.right != null)
{
// Update the currentXOR
curr_xor += M;
curr = curr.right;
}
else
{
curr = curr.left;
}
}
else
{
// Check if left node exists
if (curr.left != null)
{
// Update the currentXOR
curr_xor += M;
curr = curr.left;
}
else
{
curr = curr.right;
}
}
// Update M to M/2 for next set bit
M /= 2;
}
// Update the maximum XOR
ans = Math.max(ans, curr_xor);
}
// Return the maximum XOR found
return ans;
}
// Driver Code
public static void main(String[] args)
{
// Given array arr[]
int arr[] = { 1, 2, 3, 4 };
int N = arr.length;
// Function call
System.out.print(findMaximumXOR(arr, N));
}
}
// This code is contributed by Amit KatiyarC#
// C# program for
// the above approach
using System;
class GFG{
// Structure of Tree
public class node
{
public node left;
public node right;
};
// Function to insert binary
// representation of element
// x in the Tree
static void insert(int x,
node head)
{
// Store the head
node curr = head;
for(int i = 30; i >= 0; i--)
{
// Find the i-th bit
int val = (x >> i) & 1;
if (val == 0)
{
// If curr.left is null
if (curr.left == null)
curr.left = new node();
// Update curr to curr.left
curr = curr.left;
}
else
{
// If curr.right is null
if (curr.right == null)
curr.right = new node();
// Update curr to curr.right
curr = curr.right;
}
}
}
// Function that finds the maximum
// Bitwise XOR value for all
// such pairs
static int findMaximumXOR(int []arr,
int n)
{
// Head Node of Tree
node head = new node();
// Insert each element in tree
for(int i = 0; i < n; i++)
{
insert(arr[i], head);
}
// Stores the maximum XOR value
int ans = 0;
// Traverse the given array
for(int i = 0; i < n; i++)
{
// Stores the XOR with
// current value arr[i]
int curr_xor = 0;
int M = (int)Math.Pow(2, 30);
node curr = head;
for(int j = 30; j >= 0; j--)
{
// Finding ith bit
int val = (arr[i] >> j) & 1;
// Check if the bit is 0
if (val == 0)
{
// If right node exists
if (curr.right != null)
{
// Update the currentXOR
curr_xor += M;
curr = curr.right;
}
else
{
curr = curr.left;
}
}
else
{
// Check if left node exists
if (curr.left != null)
{
// Update the currentXOR
curr_xor += M;
curr = curr.left;
}
else
{
curr = curr.right;
}
}
// Update M to M/2
// for next set bit
M /= 2;
}
// Update the maximum XOR
ans = Math.Max(ans, curr_xor);
}
// Return the maximum
// XOR found
return ans;
}
// Driver Code
public static void Main(String[] args)
{
// Given array []arr
int []arr = {1, 2, 3, 4};
int N = arr.Length;
// Function call
Console.Write(findMaximumXOR(arr, N));
}
}
// This code is contributed by Rajput-Ji输出:
7
时间复杂度: O(32 * N)
辅助空间: O(32 * N)