This paper is concerned with the minimum distance computation for higher dimensional toric codes defined by lattice polytopes in $\mathbb{R}^n$. We show that the minimum distance is multiplicative with respect to taking the product of polytopes, and behaves in a simple way when one builds a k-dilate of a pyramid over a polytope. This allows us to construct a large class of examples of higher dimensional toric codes where we can compute the minimum distance explicitly
International audienceAny integral convex polytope $P$ in $\mathbb{R}^N$ provides a $N$-dimensional ...
We exhibit seven linear codes exceeding the current best known minimum distance d for their dimensio...
Toric codes are obtained by evaluating rational functions of a nonsin-gular toric variety at the alg...
In this paper we discuss combinatorial questions about lattice polytopes motivated by recent results...
In this paper we prove new lower bounds for the minimum distance of a toric surface code CP defined ...
We describe two different approaches to making systematic classifications of plane lattice polygons,...
We call a polytope terraced if upon projecting onto a one-dimensional coordinate space, each fiber o...
In 1998, J. P. Hansen introduced the construction of an error-correcting code over a finite field Fq...
Abstract. In this paper we discuss combinatorial questions about lattice polytopes motivated by rece...
AbstractToric codes are obtained by evaluating rational functions of a nonsingular toric variety at ...
AbstractFrom a rational convex polytope of dimension r⩾2 J.P. Hansen constructed an error correcting...
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 this paper we construct evaluation codes on zero-dimensional complete intersections in toric vari...
AbstractFor z1,z2,z3∈Zn, the tristance d3(z1,z2,z3) is a generalization of the L1-distance on Zn to ...
International audienceAny integral convex polytope $P$ in $\mathbb{R}^N$ provides a $N$-dimensional ...
We exhibit seven linear codes exceeding the current best known minimum distance d for their dimensio...
Toric codes are obtained by evaluating rational functions of a nonsin-gular toric variety at the alg...
In this paper we discuss combinatorial questions about lattice polytopes motivated by recent results...
In this paper we prove new lower bounds for the minimum distance of a toric surface code CP defined ...
We describe two different approaches to making systematic classifications of plane lattice polygons,...
We call a polytope terraced if upon projecting onto a one-dimensional coordinate space, each fiber o...
In 1998, J. P. Hansen introduced the construction of an error-correcting code over a finite field Fq...
Abstract. In this paper we discuss combinatorial questions about lattice polytopes motivated by rece...
AbstractToric codes are obtained by evaluating rational functions of a nonsingular toric variety at ...
AbstractFrom a rational convex polytope of dimension r⩾2 J.P. Hansen constructed an error correcting...
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 this paper we construct evaluation codes on zero-dimensional complete intersections in toric vari...
AbstractFor z1,z2,z3∈Zn, the tristance d3(z1,z2,z3) is a generalization of the L1-distance on Zn to ...
International audienceAny integral convex polytope $P$ in $\mathbb{R}^N$ provides a $N$-dimensional ...
We exhibit seven linear codes exceeding the current best known minimum distance d for their dimensio...
Toric codes are obtained by evaluating rational functions of a nonsin-gular toric variety at the alg...