Add to ORKGIn this paper we study families of generalized geometric sequences formed by applying a feedforward function to certain sums of decimated m-sequences with elements in a nite eld. We compute their correlation functions, which for certain families turn out to be close to the square root of the period. The size of these families equals their period. We also show that in the binary case the linear complexities of these sequences are much larger than those of cascaded geometric sequences, although in these cases the maximum correlations are larger
We prove a new lower bound on the aperiodic correlation function of Galois ring m-sequences by apply...
Abstract—In this paper, we generalize the construction method of the family of binary bent sequences...
In this thesis we focus on two main properties of sequences which have wide range of applications in...
Abstract — In this paper we study families of generalized geometric sequences formed by applying a f...
AbstractExplicit formulas for cross-correlation functions of the so-called linearly related generali...
AbstractIn this paper we study the cross-correlation function values of geometric sequences obtained...
In this paper, we give a classification of a sequence family, over arbitrary characteristic, adding ...
The design of code division multiple access sequence families dates back to the Gold sequences from ...
The design of CDMA sequence families dates back to the Gold sequences from the 1960s. Since then the...
AbstractIn this paper we study the cross-correlation function values of geometric sequences obtained...
A class of pseudorandom sequences over GF(pm) which are the generalization of m-sequences are constr...
AbstractExplicit formulas for cross-correlation functions of the so-called linearly related generali...
Cross-correlation functions are determined for a large class of geometric sequences based on m-seque...
In this thesis, we first study the correlations of some arithmetic sequences. We prove the existence...
This thesis is divided into two major topics. In the first, we study the topic of distribution of se...
We prove a new lower bound on the aperiodic correlation function of Galois ring m-sequences by apply...
Abstract—In this paper, we generalize the construction method of the family of binary bent sequences...
In this thesis we focus on two main properties of sequences which have wide range of applications in...
Abstract — In this paper we study families of generalized geometric sequences formed by applying a f...
AbstractExplicit formulas for cross-correlation functions of the so-called linearly related generali...
AbstractIn this paper we study the cross-correlation function values of geometric sequences obtained...
In this paper, we give a classification of a sequence family, over arbitrary characteristic, adding ...
The design of code division multiple access sequence families dates back to the Gold sequences from ...
The design of CDMA sequence families dates back to the Gold sequences from the 1960s. Since then the...
AbstractIn this paper we study the cross-correlation function values of geometric sequences obtained...
A class of pseudorandom sequences over GF(pm) which are the generalization of m-sequences are constr...
AbstractExplicit formulas for cross-correlation functions of the so-called linearly related generali...
Cross-correlation functions are determined for a large class of geometric sequences based on m-seque...
In this thesis, we first study the correlations of some arithmetic sequences. We prove the existence...
This thesis is divided into two major topics. In the first, we study the topic of distribution of se...
We prove a new lower bound on the aperiodic correlation function of Galois ring m-sequences by apply...
Abstract—In this paper, we generalize the construction method of the family of binary bent sequences...
In this thesis we focus on two main properties of sequences which have wide range of applications in...