Abstract. We discuss the problem of determining the complete weight hier-archy of linear error correcting codes associated to Grassmann varieties and, more generally, to Schubert varieties in Grassmannians. In geometric terms, this corresponds to the determination of the maximum number of Fq-rational points on sections of Schubert varieties (with nondegenerate Plücker embed-ding) by linear subvarieties of a fixed (co)dimension. The problem is partially solved in the case of Grassmann codes, and one of the solutions uses the com-binatorial notion of a close family. We propose a generalization of this to what is called a subclose family. A number of properties of subclose families are proved, and its connection with the notion of threshold g...
We use a theorem of Chow (1949) on line-preserving bijections of Grassmannians to determine the auto...
AbstractIn this paper we continue the investigation of a family of linear block codes based on the g...
AbstractWords of low weight in trace codes correspond to curves with many points and the same holds ...
We discuss the problem of determining the complete weight hierarchy of linear error correcting codes...
We consider linear codes associated to Schubert varieties in Grassmannians. A formula for the minimu...
We consider linear error correcting codes associated to higher-dimensional projective varieties defi...
We consider linear error correcting codes associated to higher-dimensional projective varieties defi...
AbstractWe consider linear error correcting codes associated to higher-dimensional projective variet...
We consider the question of determining the maximum number of points on sections of Grassmannians ov...
AbstractWe study subsets of Grassmann varieties G(l,m) over a field F, such that these subsets are u...
AbstractWe consider the question of determining the maximum number of points on sections of Grassman...
Abstract. Linear error correcting codes associated to Schubert varieties in Grassmannians were intro...
Using a combinatorial approach to studying the hyperplane sections of Grassmannians, we give two new...
AbstractPerfect codes and optimal anticodes in the Grassman graph Gq(n, k) are examined. It is shown...
We construct linear codes from scrolls over curves of high genus and study the higher support weight...
We use a theorem of Chow (1949) on line-preserving bijections of Grassmannians to determine the auto...
AbstractIn this paper we continue the investigation of a family of linear block codes based on the g...
AbstractWords of low weight in trace codes correspond to curves with many points and the same holds ...
We discuss the problem of determining the complete weight hierarchy of linear error correcting codes...
We consider linear codes associated to Schubert varieties in Grassmannians. A formula for the minimu...
We consider linear error correcting codes associated to higher-dimensional projective varieties defi...
We consider linear error correcting codes associated to higher-dimensional projective varieties defi...
AbstractWe consider linear error correcting codes associated to higher-dimensional projective variet...
We consider the question of determining the maximum number of points on sections of Grassmannians ov...
AbstractWe study subsets of Grassmann varieties G(l,m) over a field F, such that these subsets are u...
AbstractWe consider the question of determining the maximum number of points on sections of Grassman...
Abstract. Linear error correcting codes associated to Schubert varieties in Grassmannians were intro...
Using a combinatorial approach to studying the hyperplane sections of Grassmannians, we give two new...
AbstractPerfect codes and optimal anticodes in the Grassman graph Gq(n, k) are examined. It is shown...
We construct linear codes from scrolls over curves of high genus and study the higher support weight...
We use a theorem of Chow (1949) on line-preserving bijections of Grassmannians to determine the auto...
AbstractIn this paper we continue the investigation of a family of linear block codes based on the g...
AbstractWords of low weight in trace codes correspond to curves with many points and the same holds ...