AbstractBased on algebraic number theory we construct some families of rotated Dn-lattices with full diversity which can be good for signal transmission over both Gaussian and Rayleigh fading channels. Closed-form expressions for the minimum product distance of those lattices are obtained through algebraic properties
Abstract – In this talk we review some recent algebraic constructions of rotated cubic lattice const...
There is a rich theory of relations between lattices and linear codes over finite fields. However, t...
We investigate distribution of integral well-rounded lattices in the plane, parameterizing the set o...
Based on algebraic number theory we construct some families of rotated D n-lattices with full divers...
In this work, we present constructions of families of rotated $D_n$-lattices which may be good forsi...
In this work, we present constructions of families of rotated $D_n$-lattices which may be good forsi...
The aim of this paper is to investigate rotated versions of the densest known lattices in dimensions...
In this work, we give a bound on performance of any full-diversity lattice constellation constructed...
In this work, we present a explicit trace forms for maximal real subfields of cyclotomic fields as t...
In this work, we present a explicit trace forms for maximal real subfields of cyclotomic fields as t...
The aim of this paper is to investigate rotated versions of the densest known lattices in dimensions...
In this paper we present a method for evaluating the center density of algebraic lattices from subfi...
In this paper, we study lattice coding for Rician fading wireless channels. This is motivated in par...
In this paper we present a method for evaluating the center density of algebraic lattices from subfi...
Abstract — We study the error probability performance of ro-tated lattice constellations in frequenc...
Abstract – In this talk we review some recent algebraic constructions of rotated cubic lattice const...
There is a rich theory of relations between lattices and linear codes over finite fields. However, t...
We investigate distribution of integral well-rounded lattices in the plane, parameterizing the set o...
Based on algebraic number theory we construct some families of rotated D n-lattices with full divers...
In this work, we present constructions of families of rotated $D_n$-lattices which may be good forsi...
In this work, we present constructions of families of rotated $D_n$-lattices which may be good forsi...
The aim of this paper is to investigate rotated versions of the densest known lattices in dimensions...
In this work, we give a bound on performance of any full-diversity lattice constellation constructed...
In this work, we present a explicit trace forms for maximal real subfields of cyclotomic fields as t...
In this work, we present a explicit trace forms for maximal real subfields of cyclotomic fields as t...
The aim of this paper is to investigate rotated versions of the densest known lattices in dimensions...
In this paper we present a method for evaluating the center density of algebraic lattices from subfi...
In this paper, we study lattice coding for Rician fading wireless channels. This is motivated in par...
In this paper we present a method for evaluating the center density of algebraic lattices from subfi...
Abstract — We study the error probability performance of ro-tated lattice constellations in frequenc...
Abstract – In this talk we review some recent algebraic constructions of rotated cubic lattice const...
There is a rich theory of relations between lattices and linear codes over finite fields. However, t...
We investigate distribution of integral well-rounded lattices in the plane, parameterizing the set o...
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