About this item
- Title
- Locally recoverable codes on surfaces
- Content partner
- University of Canterbury Library
- Collection
- UC Research Repository
- Description
A linear error correcting code is a subspace of a finite-dimensional space over a finite field with a fixed coordinate system. Such a code is said to be locally recoverable with locality r if, for every coordinate, its value at a codeword can be deduced from the value of (certain) r other coordinates of the codeword. These codes have found many recent applications, e.g., to distributed cloud storage. We will discuss the problem of constructing good locally recoverable codes and present some c...
- Format
- Research paper
- Research format
- Journal article
- Date created
- 2021
- Creator
- Salgado C / Varilly-Alvarado A / Voloch, Jose
- URL
- https://hdl.handle.net/10092/102797
- Related subjects
- cs.IT / math.AG / math.IT / Artificial Intelligence and Image Processing / Electrical and Electronic Engineering / Communications Technologies / Mathematical sciences / Pure mathematics / Algebra and number theory / Algebraic and differential geometry / Engineering / Communications engineering / Optical fibre communication systems and technologies / Information and computing sciences / Distributed computing and systems software / Dependable systems
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What can I do with this item?
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Report this itemDigitalNZ brings together more than 30 million items from institutions so that they are easy to find and use. This information is the best information we could find on this item. This item was added on 25 October 2022, and updated 01 April 2025.
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