On prefix codes satisfying RLL-constraint for Zipf distribution
The study of Information Theory has been ubiquitously applied to many fields in the digital world, with significant focus in transmitting data through channels as efficiently as possible. Therein lies the Optimal Coding Problem; where symbols of varying probabilities of occurring in the source text...
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Nanyang Technological University
2020
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sg-ntu-dr.10356-1433382023-02-28T23:55:01Z On prefix codes satisfying RLL-constraint for Zipf distribution Ho, Shaun Kiah Han Mao School of Physical and Mathematical Sciences HMKiah@ntu.edu.sg Science::Mathematics The study of Information Theory has been ubiquitously applied to many fields in the digital world, with significant focus in transmitting data through channels as efficiently as possible. Therein lies the Optimal Coding Problem; where symbols of varying probabilities of occurring in the source text are encoded to as few bits as possible. In this thesis, we will focus on special type of codes which are bound by the Runlength-limited constraint. We apply this constraint to familiar optimal compression algorithms, like Huffman coding, as well as construct our own version of these constraint codes, with help from a dynamic programming algorithm made by Golin. The results obtained from testing the efficiency of these codes showed that Golin’s construction is more efficient than Huffman coding with the Runlength-limited constraint, in terms of optimality. Finally, we further analyse the structures of coding trees that follow the Runlength-limited constraint and show that such trees produce very particularly unique patterns. Master of Science 2020-08-25T06:06:47Z 2020-08-25T06:06:47Z 2020 Thesis-Master by Research Ho, S. (2020). On prefix codes satisfying RLL-constraint for Zipf distribution. Master's thesis, Nanyang Technological University, Singapore. https://hdl.handle.net/10356/143338 10.32657/10356/143338 en This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License (CC BY-NC 4.0). application/pdf Nanyang Technological University |
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Science::Mathematics Ho, Shaun On prefix codes satisfying RLL-constraint for Zipf distribution |
| description |
The study of Information Theory has been ubiquitously applied to many fields in the digital world, with significant focus in transmitting data through channels as efficiently as possible. Therein lies the Optimal Coding Problem; where symbols of varying probabilities of occurring in the source text are encoded to as few bits as possible. In this thesis, we will focus on special type of codes which are bound by the Runlength-limited constraint. We apply this constraint to familiar optimal compression algorithms, like Huffman coding, as well as construct our own version of these constraint codes, with help from a dynamic programming algorithm made by Golin. The results obtained from testing the efficiency of these codes
showed that Golin’s construction is more efficient than Huffman coding with the Runlength-limited constraint, in terms of optimality. Finally, we further analyse the structures of coding trees that follow the Runlength-limited constraint and show that such trees produce very particularly unique patterns. |
| author2 |
Kiah Han Mao |
| author_facet |
Kiah Han Mao Ho, Shaun |
| format |
Thesis-Master by Research |
| author |
Ho, Shaun |
| author_sort |
Ho, Shaun |
| title |
On prefix codes satisfying RLL-constraint for Zipf distribution |
| title_short |
On prefix codes satisfying RLL-constraint for Zipf distribution |
| title_full |
On prefix codes satisfying RLL-constraint for Zipf distribution |
| title_fullStr |
On prefix codes satisfying RLL-constraint for Zipf distribution |
| title_full_unstemmed |
On prefix codes satisfying RLL-constraint for Zipf distribution |
| title_sort |
on prefix codes satisfying rll-constraint for zipf distribution |
| publisher |
Nanyang Technological University |
| publishDate |
2020 |
| url |
https://hdl.handle.net/10356/143338 |
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