We introduce a combinatorial representation for linear block codes, called the junction tree representation, which generalizes the notion of code trellis. We first present an algorithm for finding a minimum complexity junction tree. We then show by example that the minimum complexity junction tree can be less complex than the minimal trellis. One implication of this is that one can sometimes devise exact decoding algorithms which have lower complexity than those associated with the minimal trellis
NOTE: Text or symbols not renderable in plain ASCII are indicated by [...]. Abstract is included in ...
AbstractBlock codes are viewed from a formal language theoretic perspective. It is shown that proper...
We give simple algorithms for the construction of generator matrices for minimal tail-biting trellis...
We introduce a combinatorial representation for linear block codes, called the junction tree represe...
We look at graphical descriptions of block codes known as trellises, which illustrate connections be...
Abstruct- In this partially tutorial paper, we examine minimal trellis representations of linear blo...
We look at graphical descriptions of block codes known as trellises, which illustrate connections be...
The authors introduce a new simple encoding technique which allows the design of a wide variety of l...
A novel trellis design technique for both block and convolutional codes based on the Shannon (1956) ...
An important problem in the theory and application of block code trellises is to find a coordinate p...
This paper presents two new iterative algorithms for decoding linear codes based on their tail bitin...
Block codes are first viewed as finite state automata represented as trellises. A technique termed s...
We consider the problem of finding a trellis for a linear block code that minimizes one or more meas...
The trellis structure of linear block codes (LBCs) is discussed. The state and branch complexities o...
Block codes are viewed from a formal language theoretic perspective. It is shown that properties of ...
NOTE: Text or symbols not renderable in plain ASCII are indicated by [...]. Abstract is included in ...
AbstractBlock codes are viewed from a formal language theoretic perspective. It is shown that proper...
We give simple algorithms for the construction of generator matrices for minimal tail-biting trellis...
We introduce a combinatorial representation for linear block codes, called the junction tree represe...
We look at graphical descriptions of block codes known as trellises, which illustrate connections be...
Abstruct- In this partially tutorial paper, we examine minimal trellis representations of linear blo...
We look at graphical descriptions of block codes known as trellises, which illustrate connections be...
The authors introduce a new simple encoding technique which allows the design of a wide variety of l...
A novel trellis design technique for both block and convolutional codes based on the Shannon (1956) ...
An important problem in the theory and application of block code trellises is to find a coordinate p...
This paper presents two new iterative algorithms for decoding linear codes based on their tail bitin...
Block codes are first viewed as finite state automata represented as trellises. A technique termed s...
We consider the problem of finding a trellis for a linear block code that minimizes one or more meas...
The trellis structure of linear block codes (LBCs) is discussed. The state and branch complexities o...
Block codes are viewed from a formal language theoretic perspective. It is shown that properties of ...
NOTE: Text or symbols not renderable in plain ASCII are indicated by [...]. Abstract is included in ...
AbstractBlock codes are viewed from a formal language theoretic perspective. It is shown that proper...
We give simple algorithms for the construction of generator matrices for minimal tail-biting trellis...