We call a polytope terraced if upon projecting onto a one-dimensional coordinate space, each fiber of the projection is contained in the fiber below it. We present a technique to compute the minimum distance for toric codes arising from terraced polytopes. This technique is demonstrated by determining the minimum distance for all toric codes that correspond to smooth n –polytopes with n+2 facets. We also find the minimum distance for all toric codes coming from smooth polygons with five edges and from smooth polyhedra with six facets
Toric codes are obtained by evaluating rational functions of a nonsin-gular toric variety at the alg...
AbstractFrom a rational convex polytope of dimension r⩾2 J.P. Hansen constructed an error correcting...
In this paper we investigate the minimum distance of generalized toric codes using an order bound li...
We call a polytope terraced if upon projecting onto a one-dimensional coordinate space, each fiber o...
Abstract. In this paper we discuss combinatorial questions about lattice polytopes motivated by rece...
In this paper we discuss combinatorial questions about lattice polytopes motivated by recent results...
This paper is concerned with the minimum distance computation for higher dimensional toric codes def...
From a rational convex polytope of dimension r ≥ 2 J.P. Hansen con-structed an error correcting code...
We define a statistical measure of the typical size of words of low weight in a linear code over a f...
In 1998, J. P. Hansen introduced the construction of an error-correcting code over a finite field Fq...
We describe two different approaches to making systematic classifications of plane lattice polygons,...
International audienceAny integral convex polytope $P$ in $\mathbb{R}^N$ provides a $N$-dimensional ...
In this paper we prove new lower bounds for the minimum distance of a toric surface code CP defined ...
. For any integral convex polytope in R 2 there is an explicit construction of an error-correcting...
AbstractToric codes are obtained by evaluating rational functions of a nonsingular toric variety at ...
Toric codes are obtained by evaluating rational functions of a nonsin-gular toric variety at the alg...
AbstractFrom a rational convex polytope of dimension r⩾2 J.P. Hansen constructed an error correcting...
In this paper we investigate the minimum distance of generalized toric codes using an order bound li...
We call a polytope terraced if upon projecting onto a one-dimensional coordinate space, each fiber o...
Abstract. In this paper we discuss combinatorial questions about lattice polytopes motivated by rece...
In this paper we discuss combinatorial questions about lattice polytopes motivated by recent results...
This paper is concerned with the minimum distance computation for higher dimensional toric codes def...
From a rational convex polytope of dimension r ≥ 2 J.P. Hansen con-structed an error correcting code...
We define a statistical measure of the typical size of words of low weight in a linear code over a f...
In 1998, J. P. Hansen introduced the construction of an error-correcting code over a finite field Fq...
We describe two different approaches to making systematic classifications of plane lattice polygons,...
International audienceAny integral convex polytope $P$ in $\mathbb{R}^N$ provides a $N$-dimensional ...
In this paper we prove new lower bounds for the minimum distance of a toric surface code CP defined ...
. For any integral convex polytope in R 2 there is an explicit construction of an error-correcting...
AbstractToric codes are obtained by evaluating rational functions of a nonsingular toric variety at ...
Toric codes are obtained by evaluating rational functions of a nonsin-gular toric variety at the alg...
AbstractFrom a rational convex polytope of dimension r⩾2 J.P. Hansen constructed an error correcting...
In this paper we investigate the minimum distance of generalized toric codes using an order bound li...