Galois geometries and coding theory are two research areas which have been interacting with each other for many decades. From the early examples linking linear MDS codes with arcs in finite projective spaces, linear codes meeting the Griesmer bound with minihypers, covering radius with saturating sets, links have evolved to functional codes, generalized projective Reed-Muller codes, and even further to LDPC codes, random network codes, and distributed storage. This article reviews briefly the known links, and then focuses on new links and new directions. We present new results and open problems to stimulate the research on Galois geometries, coding theory, and on their continuously developing and increasing interactions
We develop three approaches of combinatorial flavor to study the structure of minimal codes and cutt...
Let ℳ denote the Mathieu group on 24 points. Let G be the subgroup of ℳ which has three sets of tran...
Survey chapter to appear in "A Concise Encyclopedia of Coding Theory", W.C. Huffman, J.-L. Kim, and ...
Galois geometries and coding theory are two research areas which have been interacting with each oth...
This section states the basic properties of Galois geometries; it is similar to [1408, Section 14.4]...
Apart from being an interesting and exciting area in combinatorics with beautiful results, finite pr...
We explore the connections between finite geometry and algebraic coding theory, giving a rather full...
A linear [n, k]-code C is a k-dimensional subspace of V (n, q), where V (n, q) denotes the n-dimensi...
Projective space of order $n$ over a finite field $GF(q)$, denoted by $\mathcal{P}_{q}(n),$ is a set...
When information is transmitted, errors are likely to occur. Coding theory examines efficient ways o...
AbstractThe aim of this paper is to survey relationships between linear block codes over finite fiel...
Coding theory and Galois geometries are two research areas which greatly influence each other. In th...
In the presented work we define a class of error-correcting codes based on incidence vectors of proj...
Algebraic Geometry Codes: Advanced Chapters is devoted to the theory of algebraic geometry codes, a ...
Galois spaces, that is affine and projective spaces of dimension N ≥ 2 defined over a finite (Galois...
We develop three approaches of combinatorial flavor to study the structure of minimal codes and cutt...
Let ℳ denote the Mathieu group on 24 points. Let G be the subgroup of ℳ which has three sets of tran...
Survey chapter to appear in "A Concise Encyclopedia of Coding Theory", W.C. Huffman, J.-L. Kim, and ...
Galois geometries and coding theory are two research areas which have been interacting with each oth...
This section states the basic properties of Galois geometries; it is similar to [1408, Section 14.4]...
Apart from being an interesting and exciting area in combinatorics with beautiful results, finite pr...
We explore the connections between finite geometry and algebraic coding theory, giving a rather full...
A linear [n, k]-code C is a k-dimensional subspace of V (n, q), where V (n, q) denotes the n-dimensi...
Projective space of order $n$ over a finite field $GF(q)$, denoted by $\mathcal{P}_{q}(n),$ is a set...
When information is transmitted, errors are likely to occur. Coding theory examines efficient ways o...
AbstractThe aim of this paper is to survey relationships between linear block codes over finite fiel...
Coding theory and Galois geometries are two research areas which greatly influence each other. In th...
In the presented work we define a class of error-correcting codes based on incidence vectors of proj...
Algebraic Geometry Codes: Advanced Chapters is devoted to the theory of algebraic geometry codes, a ...
Galois spaces, that is affine and projective spaces of dimension N ≥ 2 defined over a finite (Galois...
We develop three approaches of combinatorial flavor to study the structure of minimal codes and cutt...
Let ℳ denote the Mathieu group on 24 points. Let G be the subgroup of ℳ which has three sets of tran...
Survey chapter to appear in "A Concise Encyclopedia of Coding Theory", W.C. Huffman, J.-L. Kim, and ...