Add to ORKGWe study those functions that can be written as a finite sum of periodic integer valued functions. On ℤ we give three different characterizations of these functions. For this we prove that the existence of a real valued periodic decomposition of a ℤ → ℤ function implies the existence of an integer valued periodic decomposition with the same periods. This result depends on the representation of the greatest common divisor of certain polynomials with integer coefficients as a linear combination of the given polynomials where the coefficients also belong to ℤ[x]. We give an example of an ℤ → {0, 1} function that has a bounded real valued periodic decomposition but does not have a bounded integer valued...
ABSTRACT. A beautiful theorem of Zeckendorf states that every positive integer can be uniquely decom...
AbstractIf p(n, k) is the number of partitions of n into parts ≤k, then the sequence {p(k, k), p(k +...
AbstractIn 1965, Fine and Wilf proved the following theorem: if (fn)n⩾0 and (gn)n⩾0 are periodic seq...
AbstractWe study those functions that can be written as a sum of (almost everywhere) integer valued ...
AbstractWe study those functions that can be written as a sum of (almost everywhere) integer valued ...
AbstractWe study properties of the periodicity of an infinite integer sequence (mod M) generated by ...
In this paper we present some results related to the problem of finding periodic representations for...
International audienceWe prove a structure theorem for multiplicativefunctions whichstates that an ...
Fix an odd prime p. If r is a positive integer and f is a polynomial with coefficients in Fpr, let P...
A novel representation of a quasi-periodic modified von Mangoldt function L(n) on prime numbers and ...
AbstractIn part II of a series of articles on the least common multiple, the central object of inves...
AbstractIf s(t) is a periodic sequence from GF(q) = F, and if N is the number of times a non-zero el...
A regular or singular continuant is the denominator of a terminating regular or singular continued f...
Although versions of Poisson’s Summation Formula (PSF) have already been studied extensively, there ...
Although versions of Poisson’s Summation Formula (PSF) have already been studied extensively, there ...
ABSTRACT. A beautiful theorem of Zeckendorf states that every positive integer can be uniquely decom...
AbstractIf p(n, k) is the number of partitions of n into parts ≤k, then the sequence {p(k, k), p(k +...
AbstractIn 1965, Fine and Wilf proved the following theorem: if (fn)n⩾0 and (gn)n⩾0 are periodic seq...
AbstractWe study those functions that can be written as a sum of (almost everywhere) integer valued ...
AbstractWe study those functions that can be written as a sum of (almost everywhere) integer valued ...
AbstractWe study properties of the periodicity of an infinite integer sequence (mod M) generated by ...
In this paper we present some results related to the problem of finding periodic representations for...
International audienceWe prove a structure theorem for multiplicativefunctions whichstates that an ...
Fix an odd prime p. If r is a positive integer and f is a polynomial with coefficients in Fpr, let P...
A novel representation of a quasi-periodic modified von Mangoldt function L(n) on prime numbers and ...
AbstractIn part II of a series of articles on the least common multiple, the central object of inves...
AbstractIf s(t) is a periodic sequence from GF(q) = F, and if N is the number of times a non-zero el...
A regular or singular continuant is the denominator of a terminating regular or singular continued f...
Although versions of Poisson’s Summation Formula (PSF) have already been studied extensively, there ...
Although versions of Poisson’s Summation Formula (PSF) have already been studied extensively, there ...
ABSTRACT. A beautiful theorem of Zeckendorf states that every positive integer can be uniquely decom...
AbstractIf p(n, k) is the number of partitions of n into parts ≤k, then the sequence {p(k, k), p(k +...
AbstractIn 1965, Fine and Wilf proved the following theorem: if (fn)n⩾0 and (gn)n⩾0 are periodic seq...