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Line 7: Central to the performance of LDPC codes is their adaptability to the iterative [[belief propagation]] decoding algorithm. Under this algorithm, they can be designed to approach theoretical limits ([[Channel capacity\|capacities]]) of many channels<ref>{{Cite web \|title=Design of capacity-approaching irregular low-density parity-check codes \|url=https://ieeexplore.ieee.org/document/910578 \|archive-url=http://web.archive.org/web/20240909161749/https://ieeexplore.ieee.org/document/910578/ \|archive-date=2024-09-09 \|access-date=2024-12-18 \|website=ieeexplore.ieee.org \|language=en-US}}</ref> at low computation costs. Theoretically, analysis of ~~the~~LDPC codes focuses on sequences of ~~LDPC~~ codes of fixed [[code rate]] and increasing [[block length]]. These sequences are typically tailored to a set of channels. For appropriately designed sequences, the decoding error under belief propagation can often be proven to be vanishingly small (approaches zero with the block length) at rates that are very close to the capacities of the channels. Furthermore, this can be achieved at a complexity that is linear in the block length. This theoretical performance is made possible using a flexible design method that is based on sparse [[Tanner graph\|Tanner graphs]] (specialized [[bipartite graph\|bipartite graphs]]).<ref>{{citation \|author=Amin Shokrollahi \|url=http://www.ics.uci.edu/~welling/teaching/ICS279/LPCD.pdf \|title=LDPC Codes: An Introduction \|archive-url=https://web.archive.org/web/20170517034849/http://www.ics.uci.edu/~welling/teaching/ICS279/LPCD.pdf \|archive-date=2017-05-17}}</ref>

Low-density parity-check code: Difference between revisions