Bounds on the Parameters of Locally Recoverable Codes

June 23, 2015 Β· Declared Dead Β· πŸ› IEEE Transactions on Information Theory

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Authors Itzhak Tamo, Alexander Barg, Alexey Frolov arXiv ID 1506.07196 Category cs.IT: Information Theory Citations 150 Venue IEEE Transactions on Information Theory Last Checked 4 months ago
Abstract
A locally recoverable code (LRC code) is a code over a finite alphabet such that every symbol in the encoding is a function of a small number of other symbols that form a recovering set. In this paper we derive new finite-length and asymptotic bounds on the parameters of LRC codes. For LRC codes with a single recovering set for every coordinate, we derive an asymptotic Gilbert-Varshamov type bound for LRC codes and find the maximum attainable relative distance of asymptotically good LRC codes. Similar results are established for LRC codes with two disjoint recovering sets for every coordinate. For the case of multiple recovering sets we derive a lower bound on the parameters using expander graph arguments. Finally, we also derive finite-length upper bounds on the rate and distance of LRC codes with multiple recovering sets.
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