霍夫曼编码是一种无损数据压缩算法。在该算法中,分配了可变长度代码以输入不同的字符。代码长度与字符使用频率有关。最常见的字符具有最小的代码,较长的代码具有最不频繁的字符。
主要有两个部分。第一个创建霍夫曼树,另一个遍历该树以查找代码。
例如,考虑一些字符串“ YYYZXXYYX”,字符Y的频率大于X,字符Z的频率最小。因此,Y的代码长度小于X,X的代码长度将小于Z。
根据每个字符的频率分配代码的复杂度为O(n log n)
Input: A string with different characters, say “ACCEBFFFFAAXXBLKE” Output: Code for different characters: Data: K, Frequency: 1, Code: 0000 Data: L, Frequency: 1, Code: 0001 Data: E, Frequency: 2, Code: 001 Data: F, Frequency: 4, Code: 01 Data: B, Frequency: 2, Code: 100 Data: C, Frequency: 2, Code: 101 Data: X, Frequency: 2, Code: 110 Data: A, Frequency: 3, Code: 111
huffmanCoding (字符串)
输入:不同字符的字符串。
输出:每个单独字符的代码。
Begin define a node with character, frequency, left and right child of the node for Huffman tree. create a list ‘freq’ to store frequency of each character, initially, all are 0 for each character c in the string do increase the frequency for character ch in freq list. done for all type of character ch do if the frequency of ch is non zero then add ch and its frequency as a node of priority queue Q. done while Q is not empty do remove item from Q and assign it to left child of node remove item from Q and assign to the right child of node traverse the node to find the assigned code done End
traverseNode(n:节点,代码)
输入: 霍夫曼树的节点n,以及上一次调用分配的代码
输出: 为每个字符分配的代码
if a left child of node n ≠φ then traverseNode(leftChild(n), code+’0’) //traverse through the left child traverseNode(rightChild(n), code+’1’) //traverse through the right child else display the character and data of current node.
#include
#include#include
using namespace std;
struct node {
int freq;
char data;
const node *child0, *child1;
node(char d, int f = -1) { //assign values in the node
data = d;
freq = f;
child0 = NULL;
child1 = NULL;
}
node(const node *c0, const node *c1) {
data = 0;
freq = c0->freq + c1->freq;
child0=c0;
child1=c1;
}
bool operator<( const node &a ) const { //< operator performs to find priority in queue
return freq >a.freq;
}
void traverse(string code = "")const {
if(child0!=NULL) {
child0->traverse(code+'0'); //add 0 with the code as left child
child1->traverse(code+'1'); //add 1 with the code as right child
}else {
cout << "Data: " << data<< ", Frequency: "< qu;
int frequency[256];
for(int i = 0; i<256; i++)
frequency[i] = 0; //clear all frequency
for(int i = 0; i1) {
node *c0 = new node(qu.top()); //get left child and remove from queue
qu.pop();
node *c1 = new node(qu.top()); //get right child and remove from queue
qu.pop();
qu.push(node(c0, c1)); //add freq of two child and add again in the queue
}cout <<“霍夫曼密码:” <
输出结果
The Huffman Code: Data: K, Frequency: 1, Code: 0000 Data: L, Frequency: 1, Code: 0001 Data: E, Frequency: 2, Code: 001 Data: F, Frequency: 4, Code: 01 Data: B, Frequency: 2, Code: 100 Data: C, Frequency: 2, Code: 101 Data: X, Frequency: 2, Code: 110 Data: A, Frequency: 3, Code: 111