Add to ORKGThe periodicity of sequences of integers $(a_n)_{n\in\mathbb Z}$ satisfying the inequalities $0\le a_{n-1}+\lambda a_n+a_{n+1}<1$ ($n\in\mathbb Z$) is studied for real $ \lambda $ with $|\lambda|< 2$. Periodicity is proved in case $ \lambda $ is the golden ratio; for other values of $ \lambda $ statements on possible period lengths are given. Further interesting results on the morphology of periods are illustrated. The problem is connected to the investigation of shift radix systems and of Salem numbers
Counting problems lead naturally to integer sequences. For example if one asks for the number of su...
Two natural properties of integer sequences are introduced and studied. The first, exact realizabili...
AbstractLet F(z)∈R[z] be a polynomial with positive leading coefficient, and let α>1 be an algebraic...
Arithmetic properties of integer sequences counting periodic points are studied, and applied to the ...
AbstractIt is known that the sequence 1,2,1,1,2,2,2,1,1,2,1,1,2,1,1,2,2,… of lengths of blocks of id...
International audienceWe determine periodic and aperiodic points of certain piecewise affine maps in...
35 pagesInternational audienceFor a given increasing sequence of positive integers $A=(a_k)_{k\ge 0}...
This dissertation thesis is made up of three distinct parts, connected especially by complexity noti...
AbstractWe study properties of the periodicity of an infinite integer sequence (mod M) generated by ...
Nivat's conjecture is about the link between the pure periodicity of a subset M of Z^2, i.e., invari...
AbstractIf s(t) is a periodic sequence from GF(q) = F, and if N is the number of times a non-zero el...
AbstractQueneau observed that certain 1-additive sequences (defined by Ulam) are regular in the sens...
AbstractIn part II of a series of articles on the least common multiple, the central object of inves...
AbstractWe study the periodicity of signs of Fourier coefficients of the function,∏d|αf(−qd)rd, wher...
International audienceWe show that the sets of periods of multidimensional shifts of finite type (SF...
Counting problems lead naturally to integer sequences. For example if one asks for the number of su...
Two natural properties of integer sequences are introduced and studied. The first, exact realizabili...
AbstractLet F(z)∈R[z] be a polynomial with positive leading coefficient, and let α>1 be an algebraic...
Arithmetic properties of integer sequences counting periodic points are studied, and applied to the ...
AbstractIt is known that the sequence 1,2,1,1,2,2,2,1,1,2,1,1,2,1,1,2,2,… of lengths of blocks of id...
International audienceWe determine periodic and aperiodic points of certain piecewise affine maps in...
35 pagesInternational audienceFor a given increasing sequence of positive integers $A=(a_k)_{k\ge 0}...
This dissertation thesis is made up of three distinct parts, connected especially by complexity noti...
AbstractWe study properties of the periodicity of an infinite integer sequence (mod M) generated by ...
Nivat's conjecture is about the link between the pure periodicity of a subset M of Z^2, i.e., invari...
AbstractIf s(t) is a periodic sequence from GF(q) = F, and if N is the number of times a non-zero el...
AbstractQueneau observed that certain 1-additive sequences (defined by Ulam) are regular in the sens...
AbstractIn part II of a series of articles on the least common multiple, the central object of inves...
AbstractWe study the periodicity of signs of Fourier coefficients of the function,∏d|αf(−qd)rd, wher...
International audienceWe show that the sets of periods of multidimensional shifts of finite type (SF...
Counting problems lead naturally to integer sequences. For example if one asks for the number of su...
Two natural properties of integer sequences are introduced and studied. The first, exact realizabili...
AbstractLet F(z)∈R[z] be a polynomial with positive leading coefficient, and let α>1 be an algebraic...