Your search keyword '"Pinto, Raquel"' showing total 3 results

1. Column Distances of Convolutional Codes Over ${\mathbb Z}_{p^r}$.

Author

Napp, Diego, Pinto, Raquel, and Toste, Marisa

Subjects

*ERROR-correcting codes, *COLUMN foundations, *GEOMETRIC vertices, *SINGLETON bounds, *CYCLIC codes

Abstract

Maximum distance profile codes over finite non-binary fields have been introduced and thoroughly studied in the last decade. These codes have the property that their column distances are maximal among all codes of the same rate and degree. In this paper, we aim at studying this fundamental concept in the context of convolutional codes over a finite ring. We extensively use the concept of $p$ -encoder to establish the theoretical framework and derive several bounds on the column distances. In particular, a method for constructing (not necessarily free) maximum distance profile convolutional codes over ${\mathbb Z}_{p^{r}}$ is presented. [ABSTRACT FROM AUTHOR]

Published

2019

2. Matrix fraction descriptions in convolutional coding

Author

Fornasini, Ettore and Pinto, Raquel

Subjects

*MATRICES (Mathematics), *POLYNOMIALS, *APPROXIMATION theory, *MATHEMATICS

Abstract

In this paper, polynomial matrix fraction descriptions (MFDs) are used as a tool for investigating the structure of a (linear) convolutional code and the family of its encoders and syndrome formers. As static feedback and precompensation allow to obtain all minimal encoders (in particular, polynomial encoders and decoupled encoders) of a given code, a simple parametrization of their MFDs is provided. All minimal syndrome formers, by a duality argument, are obtained by resorting to output injection and postcompensation. Decoupled encoders are finally discussed as well as the possibility of representing a convolutional code as a direct sum of smaller ones. [Copyright &y& Elsevier]

Published

2004

3. Maximum Distance Separable 2D Convolutional Codes.

Author

Climent, Joan-Josep, Napp, Diego, Perea, Carmen, and Pinto, Raquel

Subjects

*BLOCK codes, *SINGLETON bounds, *INFORMATION theory, *ERROR detection (Information theory), *ERROR correction (Information theory)

Abstract

Maximum distance separable (MDS) block codes and MDS 1D convolutional codes are the most robust codes for error correction within the class of block codes of a fixed rate and 1D convolutional codes of a certain rate and degree, respectively. In this paper, we generalize this concept to the class of 2D convolutional codes. For that, we introduce a natural bound on the distance of a 2D convolutional code of rate k/n and degree \delta , which generalizes the Singleton bound for block codes and the generalized Singleton bound for 1D convolutional codes. Then, we prove the existence of 2D convolutional codes of rate k/n and degree \delta if k {\nmid } \delta , or n \geq k (({(({\delta }/{k}) + 1)(({\delta }/{k}) + 2)})/{2})$ if $k \mid \delta $ , by presenting a concrete constructive procedure. [ABSTRACT FROM AUTHOR]

Published

2016