An Error-correction Scheme With Reed-solomon Codec For Can Bus Transmission
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error-correction scheme with Reed-Solomon codec for error detection and correction using hamming code example CAN bus transmissionAuthorsShanq-Jang Ruan + 1Shanq-Jang RuanChung-chiun LiuViewsAbstract:Abstract This paper presents an error-correction scheme error detection and correction in data link layer to enhance the performance of typical CAN bus. The proposed scheme uses Reed-Solomon (RS) codec to calculate the parity for the transmission of typical CAN bus. Compared with prior
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work in terms of Hybrid ...Shanq-Jang Ruan hasn't uploaded this paper.Let Shanq-Jang know you want this paper to be uploaded.An error-correction scheme with Reed-Solomon codec for CAN bus transmissionAuthorsShanq-Jang Ruan + 1Shanq-Jang RuanChung-chiun LiuShanq-Jang Ruan hasn't uploaded this paper. ×CloseLog InLog InwithFacebookLog InwithGoogleorEmail:Password:Remember me on this computerorreset passwordEnter the email address you signed up with and we'll email you a reset link.Need an account?Click here to sign up Job BoardAboutPressBlogPeoplePapersTermsPrivacyCopyrightWe're Hiring!Help Center Find new research papers in:PhysicsChemistryBiologyHealth SciencesEcologyEarth SciencesCognitive ScienceMathematicsComputer Science Academia © 2016
citations to reliable sources. Unsourced material may be challenged and removed. (August 2008) (Learn how and when to remove this template message) In information theory and coding theory with error correction techniques applications in computer science and telecommunication, error detection and correction or error control error detection and correction pdf are techniques that enable reliable delivery of digital data over unreliable communication channels. Many communication channels are subject to
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channel noise, and thus errors may be introduced during transmission from the source to a receiver. Error detection techniques allow detecting such errors, while error correction enables reconstruction of the original http://www.academia.edu/23746220/An_error-correction_scheme_with_Reed-Solomon_codec_for_CAN_bus_transmission data in many cases. Contents 1 Definitions 2 History 3 Introduction 4 Implementation 5 Error detection schemes 5.1 Repetition codes 5.2 Parity bits 5.3 Checksums 5.4 Cyclic redundancy checks (CRCs) 5.5 Cryptographic hash functions 5.6 Error-correcting codes 6 Error correction 6.1 Automatic repeat request (ARQ) 6.2 Error-correcting code 6.3 Hybrid schemes 7 Applications 7.1 Internet 7.2 Deep-space telecommunications 7.3 Satellite broadcasting (DVB) https://en.wikipedia.org/wiki/Error_detection_and_correction 7.4 Data storage 7.5 Error-correcting memory 8 See also 9 References 10 Further reading 11 External links Definitions[edit] The general definitions of the terms are as follows: Error detection is the detection of errors caused by noise or other impairments during transmission from the transmitter to the receiver. Error correction is the detection of errors and reconstruction of the original, error-free data. History[edit] The modern development of error-correcting codes in 1947 is due to Richard W. Hamming.[1] A description of Hamming's code appeared in Claude Shannon's A Mathematical Theory of Communication[2] and was quickly generalized by Marcel J. E. Golay.[3] Introduction[edit] The general idea for achieving error detection and correction is to add some redundancy (i.e., some extra data) to a message, which receivers can use to check consistency of the delivered message, and to recover data determined to be corrupted. Error-detection and correction schemes can be either systematic or non-systematic: In a systematic scheme, the transmitter sends the original data, and attaches a fixed number of check bits (or parity data), which are derived from the data bits by some deterministic algorithm. If only er
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