A first approximation of concatenated convolutional codes from linear systems theory viewpoint

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DOI10.1016/j.laa.2007.03.017zbMath1140.94015OpenAlexW1968360193MaRDI QIDQ998203

Carmen Perea, Victoria Herranz, Joan-Josep Climent

Publication date: 27 August 2007

Published in: Linear Algebra and its Applications (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1016/j.laa.2007.03.017

zbMATH Keywords

transfer function minimal representation observable pair concatenated convolutional code controllable pair free distance input-state-output representation observable convolutional code controllable convolutional code

Mathematics Subject Classification ID

System identification (93B30) Minimal systems representations (93B20) Realizations from input-output data (93B15) Convolutional codes (94B10)

Related Items (10)

Input-State-Output Representation of Convolutional Product Codes ⋮ \(1/n\) turbo codes from linear system point of view ⋮ Feedback equivalence of convolutional codes over finite rings ⋮ Series concatenation of 2D convolutional codes by means of input-state-output representations ⋮ Linear system modelization of concatenated block and convolutional codes ⋮ Erasure decoding of convolutional codes using first-order representations ⋮ Serial concatenation of a block code and a 2D convolutional code ⋮ Concatenated linear systems over rings and their application to construction of concatenated families of convolutional codes ⋮ Block Toeplitz matrices for burst-correcting convolutional codes ⋮ Probability estimates for reachability of linear systems defined over finite fields

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