Add to ORKGFor every nonnegative integer $n$, let $r_F(n)$ be the number of ways to write $n$ as a sum of Fibonacci numbers, where the order of the summands does not matter. Moreover, for all positive integers $p$ and $N$, let \begin{equation*} S_{F}^{(p)}(N) := \sum_{n = 0}^{N - 1} \big(r_F(n)\big)^p . \end{equation*} Chow, Jones, and Slattery determined the order of growth of $S_{F}^{(p)}(N)$ for $p \in \{1,2\}$. We prove that, for all positive integers $p$, there exists a real number $\lambda_p > 1$ such that \begin{equation*} S^{(p)}_F(N) \asymp_p N^{(\log \lambda_p) /\!\log \varphi} \end{equation*} as $N \to +\infty$. Furthermore, we show that egin{equation*} \lim_{p \to +\infty} \lambda_p^{1/p} = \varphi^{1/2} , \end{equation*} where $\varphi :=...
AbstractA summation formula related to the Fibonacci expansion of integers is given
AbstractLet R0, R1, R2,… be a nondegenerate binary linear recurrence of integers defined by Rn = ARn...
Let $\sigma_k(n)$ be the sum of the $k$th powers of the divisors of $n$. Here, we prove that if $(F_...
AbstractHere, we find all instances in which a product of Fibonacci numbers with indices in an inter...
Let ( {F_n}_{ngeq 0} ) be the sequence of Fibonacci numbers and let (p) be a prime. For an integer (...
In this paper a new method of generating identities for Fibonacci and Lu- cas numbers is presented....
AbstractA beautiful theorem of Zeckendorf states that every integer can be written uniquely as a sum...
For each positive integer k, let Ak be the set of all positive integers n such that gcd(n, Fn) = k, ...
Let A be the set of all integers of the form gcd(n,Fn), where n is a positive integer and Fn denotes...
This paper takes a historical view of some long-standing problems associated with the development of...
Let 1, 2, 3, 5, 8, … denote the Fibonacci sequence beginning with 1 and 2, and then setting each sub...
AbstractWe prove a new bound on exponential sums for nonlinear recurring sequences. This result impr...
AbstractA lower bound of Richert on the number of solutions of N − p = P3 is improved
International audienceConsider the sequence {Fn} n≥0 of Fibonacci numbers defined by F 0 = 0, F 1 = ...
AbstractIt is well-known that the Fibonacci numbers have a maximum property with respect to the leng...
AbstractA summation formula related to the Fibonacci expansion of integers is given
AbstractLet R0, R1, R2,… be a nondegenerate binary linear recurrence of integers defined by Rn = ARn...
Let $\sigma_k(n)$ be the sum of the $k$th powers of the divisors of $n$. Here, we prove that if $(F_...
AbstractHere, we find all instances in which a product of Fibonacci numbers with indices in an inter...
Let ( {F_n}_{ngeq 0} ) be the sequence of Fibonacci numbers and let (p) be a prime. For an integer (...
In this paper a new method of generating identities for Fibonacci and Lu- cas numbers is presented....
AbstractA beautiful theorem of Zeckendorf states that every integer can be written uniquely as a sum...
For each positive integer k, let Ak be the set of all positive integers n such that gcd(n, Fn) = k, ...
Let A be the set of all integers of the form gcd(n,Fn), where n is a positive integer and Fn denotes...
This paper takes a historical view of some long-standing problems associated with the development of...
Let 1, 2, 3, 5, 8, … denote the Fibonacci sequence beginning with 1 and 2, and then setting each sub...
AbstractWe prove a new bound on exponential sums for nonlinear recurring sequences. This result impr...
AbstractA lower bound of Richert on the number of solutions of N − p = P3 is improved
International audienceConsider the sequence {Fn} n≥0 of Fibonacci numbers defined by F 0 = 0, F 1 = ...
AbstractIt is well-known that the Fibonacci numbers have a maximum property with respect to the leng...
AbstractA summation formula related to the Fibonacci expansion of integers is given
AbstractLet R0, R1, R2,… be a nondegenerate binary linear recurrence of integers defined by Rn = ARn...
Let $\sigma_k(n)$ be the sum of the $k$th powers of the divisors of $n$. Here, we prove that if $(F_...