AbstractThe paper establishes a connection between the theory of permutation polynomials and the question of whether a de Bruijn sequence over a general finite field of a given linear complexity exists. The connection is used both to construct span 1 de Bruijn sequences (permutations) of a range of linear complexities and to prove non-existence results for arbitrary spans. Upper and lower bounds for the linear complexity of a de Bruijn sequence of spannover a finite field are established. Constructions are given to show that the upper bound is always tight, and that the lower bound is also tight in many cases
A de Bruijn sequence of order n is a binary string of length 2n which, when viewed cyclically, conta...
A cycle is a sequence taken in a circular order—that is, follows, and are all the same cycle as. Giv...
Based on a result of Hao Chen in 2006 we present a general procedure how to reduce the determination...
AbstractThe paper establishes a connection between the theory of permutation polynomials and the que...
AbstractWe give a complete resolution to a conjecture regarding the characterisation of linear compl...
AbstractIt has been conjectured that over any non-prime finite field Fpmand for any positive integer...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN035006 / BLDSC - British Library D...
AbstractIf s = (s0, s1,…, s2n−1) is a binary de Bruijn sequence of span n, then it has been shown th...
AbstractSequences with almost perfect linear complexity profile are of importance for the linear com...
AbstractWe introduce a generalization of Sidel’nikov sequences for arbitrary finite fields. We show ...
AbstractWe relate sequences generated by recurrences with polynomial coefficients to interleaving an...
A de Bruijn sequence over a finite alphabet of span n is a cyclic string such that all words of leng...
AbstractThe distribution γ(c, n) of de Bruijn sequences of order n and linear complexity c is invest...
A de Bruijn sequence over a finite alphabet of span n is a cyclic string such that all words of leng...
AbstractIn this paper, we consider some aspects related to determining the linear complexity of sequ...
A de Bruijn sequence of order n is a binary string of length 2n which, when viewed cyclically, conta...
A cycle is a sequence taken in a circular order—that is, follows, and are all the same cycle as. Giv...
Based on a result of Hao Chen in 2006 we present a general procedure how to reduce the determination...
AbstractThe paper establishes a connection between the theory of permutation polynomials and the que...
AbstractWe give a complete resolution to a conjecture regarding the characterisation of linear compl...
AbstractIt has been conjectured that over any non-prime finite field Fpmand for any positive integer...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN035006 / BLDSC - British Library D...
AbstractIf s = (s0, s1,…, s2n−1) is a binary de Bruijn sequence of span n, then it has been shown th...
AbstractSequences with almost perfect linear complexity profile are of importance for the linear com...
AbstractWe introduce a generalization of Sidel’nikov sequences for arbitrary finite fields. We show ...
AbstractWe relate sequences generated by recurrences with polynomial coefficients to interleaving an...
A de Bruijn sequence over a finite alphabet of span n is a cyclic string such that all words of leng...
AbstractThe distribution γ(c, n) of de Bruijn sequences of order n and linear complexity c is invest...
A de Bruijn sequence over a finite alphabet of span n is a cyclic string such that all words of leng...
AbstractIn this paper, we consider some aspects related to determining the linear complexity of sequ...
A de Bruijn sequence of order n is a binary string of length 2n which, when viewed cyclically, conta...
A cycle is a sequence taken in a circular order—that is, follows, and are all the same cycle as. Giv...
Based on a result of Hao Chen in 2006 we present a general procedure how to reduce the determination...