2007 IEEE International Symposium on Information Theory 2007
DOI: 10.1109/isit.2007.4557617
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Quaternary Convolutional Codes from Linear Block Codes over Galois Rings

Abstract: From a linear block code B over the Galois ring GR(4, m) with a k x n generator matrix and minimum Hamming distance d, a rate-k/n convolutional code over the ring 4 with squared Euclidean free distance at least 2d and a non-recursive encoder with memory at most m -1 is constructed. When the generator matrix of B is systematic, the convolutional encoder is systematic, basic, non-catastrophic and minimal. Long codes constructed in this manner are shown to satisfy a GilbertVarshamov bound.

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Cited by 2 publications
(5 citation statements)
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“…Remark 2 Conform [1,15,21,27,30] we have decided to define our codes as finite support convolutional codes. There exists however a considerable body of literature in which code sequences are semi-infinite Laurent series [7,11,18,23,24].…”
Section: Convolutional Codesmentioning
confidence: 99%
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“…Remark 2 Conform [1,15,21,27,30] we have decided to define our codes as finite support convolutional codes. There exists however a considerable body of literature in which code sequences are semi-infinite Laurent series [7,11,18,23,24].…”
Section: Convolutional Codesmentioning
confidence: 99%
“…In particular, the properties of noncatastrophic, right invertible, basic and systematic ring convolutional encoders were thoroughly discussed. The problem of deriving minimal encoders (left prime and row-reduced) was posed in [6,30]. This problem was solved in [17,16] using the concept of minimal p-encoder, which is an extension of the concept of p-basis introduced in [31] to the polynomial context.…”
Section: Introductionmentioning
confidence: 99%
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“…In this paper we seek to extend this result to the finite ring case G = Z p r , where r is a positive integer and p is a prime integer. The open problem that we solve is also mentioned in the 2007 paper [23]. We first tailor the concept of encoder to the Z p r case, making use of the specific algebraic finite chain structure of Z p r .…”
Section: Introductionmentioning
confidence: 99%
“…A more recent approach [22] (see also [7], [23]) to convolutional codes focuses on so-called "finite support convolutional codes" in which the input sequence u corresponds to a polynomial. Thus the natural time axis is Z + and both input sequences and code sequences have finite support.…”
Section: Introductionmentioning
confidence: 99%