Data Compression Technique

transcript

A Review of Data Compression Techniques

Presented By

IQxplorer

Data compression is the process of encoding data so that it takes less storage space or less transmission time than it would if it were not compressed.

Compression is possible because most real-world data is very redundant

Mainly two types of data Compression techniques are there. Loss less Compression.

Useful in spreadsheets, text, executable program Compression.

Lossy less Compression.Compression of images, movies and sounds.

Dictionary coders. Zip (file format). Lempel Ziv.

Entropy encoding. Huffman coding (simple entropy

coding). Run-length encoding.

Dictionary-based algorithms do not encode single symbols as variable-length bit strings; they encode variable-length strings of symbols as single tokens.

The tokens form an index into a phrase dictionary.

If the tokens are smaller than the phrases they replace, compression occurs.

Static Dictionary. Semi-Adaptive Dictionary. Adaptive Dictionary.

Lempel Ziv algorithms belong to this category of dictionary coders. The dictionary is being built in a single pass, while at the same time encoding the data.

The decoder can build up the dictionary in the same way as the encoder while decompressing the data.

Using a English Dictionary the string:“A good example of how dictionary based

compression works” Gives : 1/1 822/3 674/4 1343/60 928/75 550/32

173/46 421/2 Using the dictionary as lookup table, each

word is coded as x/y, where, x gives the page no. and y gives the number of the word on that page. If the dictionary has 2,200 pages with less than 256 entries per page: Therefore x requires 12 bits and y requires 8 bits, i.e., 20 bits per word (2.5 bytes per word). Using ASCII coding the above string requires 48 bytes, whereas our encoding requires only 20 (<-2.5 * 8) bytes: 50% compression.

Lempel Ziv

• It is a family of algorithms, stemming from the two algorithms proposed by Jacob Ziv and Abraham Lempel in their landmark papers in 1977 and 1978.

LZ77 LZ78

LZHLZSS LZB

LZC LZT LZMW

It is An improved version of LZ78 algorithm.

Published by Terry Welch in 1984.

A dictionary that is indexed by “codes” is used. The dictionary is assumed to be initialized with 256 entries (indexed with ASCII codes 0 through 255) representing the ASCII table.

W = NIL;while (there is input){K = next symbol from input;if (WK exists in the dictionary) {W = WK;} else {output (index(W));add WK to the dictionary;W = K;}}

The LZW Algorithm (Compression) Flow Chart

W= NULL

IS EOF?

K=NEXT INPUT

IS WKFOUND?W=WK

OUTPUT INDEX OF W

ADD WK TO DICTIONARY

Input string is The Initial

Dictionarycontains symbols like a, b, c, d with their index values as 1, 2, 3, 4 respectively.

Now the input string is read from left to right. Starting from a.

a b d c a d a c

W = Null K = a WK = aIn the dictionary.

a b d c a d a c

K = b. WK = ab is not in the

dictionary. Add WK to

dictionary Output code

for a. Set W = b

a b d c a d a c

ab 5a 1

K = d WK = bdNot in the

dictionary.Add bd to

dictionary. Output code b Set W = d

a b d c a d a c

ab 5a 1

K = a WK = da not in the

dictionary. Add it to

dictionary. Output code d Set W = a

a b d a b d a c

ab 5a 1

K = b WK = ab It is in the

dictionary.

a b d a b d a c

ab 5a 1

K = d WK = abd Not in the

dictionary. Add W to the

dictionary. Output code

for W. Set W = d

a b d a b d a c

ab 5a 1

The LZW Algorithm (Compression) Example

• K = a

• WK = da

In the dictionary.

a b d a b d a c

ab 5a 1

• K = c

• WK = dac

Not in the dictionary.

• Add WK to the dictionary.

• Output code for W.

• Set W = c

• No input left so output code for W.

a b d a b d a c

ab 5a 1

• The final output string is

1 2 4 5 7 3

• Stop.

cadbadba

LZW Decompression Algorithm

read a character k;

output k;

w = k;

while ( read a character k )

/* k could be a character or a code. */

{ entry = dictionary entry for k;

output entry;

add w + entry[0] to dictionary;

w = entry; }

LZW Decompression Algorithm Flow Chart

Output K

IS EOF?

K=NEXT INPUT

ENTRY=DICTIONARY INDEX (K)

ADD W+ENTRY[0] TO DICTIONARY

W=ENTRY

K=INPUT

Output ENTRY

The LZW Algorithm (Decompression) Example

• K = 1

• Out put K (i.e. a)

• W = K

• K = 2

• entry = b

• Output entry

• Add W + entry[0] to dictionary

• W = entry[0] (i.e. b)

• K = 4

• entry = d

• Output entry

• W = entry[0] (i.e. d)

• K = 5

• entry = ab

• Output entry

• W = entry[0] (i.e. a)

• K = 7

• entry = da

• Output entry

• W = entry[0] (i.e. d)

• K = 3

• entry = c

• Output entry

• W = entry[0] (i.e. c)

As LZW is adaptive dictionary coding no need to transfer the dictionary explicitly.

It will be created at the decoder side. LZW can be made really fast, it grabs a

fixed number of bits from input, so bit parsing is very easy, and table look up is automatic.

Problems with the encoder

• What if we run out of space?

– Keep track of unused entries and use LRU (Last Recently Used).

– Monitor compression performance and flush dictionary when performance is poor.

LZW has given new dimensions for the development of new compression techniques.

It has been implemented in well known compression format like Acrobat PDF and many other types of compression packages.

In combination with other compression techniques many other different compression techniques are developed like LZMS.

[1] http://www.bambooweb.com/articles/d/a/Data_Compression.html[2] http://tuxtina.de/files/seminar/LempelZivReport.pdf[3] BELL, T. C., CLEARY, J. G., AND WITTEN, I. H. Text Compression.

Prentice Hall, Upper Sadle River, NJ, 1990.[4] http://www.cs.cf.ac.uk/Dave/Multimedia/node214.html[5] http://download.cdsoft.co.uk/tutorials/rlecompression/Run-Length

Encoding (RLE) Tutorial.htm[6] David Salomon, Data Compression The Complete Reference,

Second Edition. Springer-Verlac, New York, Inc, 2001 reprint.[7] http://www.programmersheaven.com/2/Art_Huffman_p1.htm[8] http://www.programmersheaven.com/2/Art_Huffman_p2.htm[9] Khalid Sayood, Introduction to Data Compression Second Edition,

Chapter 5, pp. 137-157, Harcourt India Private Limited.

Data Compression Technique

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