summary:Let $\mathbb {N}$ be the set of positive integers and let $s\in \mathbb {N}$. We denote by $d^{s}$ the arithmetic function given by $ d^{s}( n) =( d( n) ) ^{s}$, where $d(n)$ is the number of positive divisors of $n$. Moreover, for every $\ell ,m\in \mathbb {N}$ we denote by $\delta ^{s,\ell ,m}( n) $ the sequence $$ \underbrace {d^{s}( d^{s}( \ldots d^{s}( d^{s}( n) +\ell ) +\ell \ldots ) +\ell ) }_{m\text {-times}} =\begin {cases} d^{s}( n) & \text {for} \ m=1,\\ d^{s}( d^{s}( n) +\ell ) &\text {for} \ m=2,\\ d^{s}(d^{s}( d^{s}(n) +\ell ) +\ell ) & \text {for} \ m=3, \\ \vdots & \end {cases} $$ We present classical and nonclassical notes on the sequence $ ( \delta ^{s,\ell ,m}( n)) _{m\geq 1}$, where $\ell $, $n$, $s$ are understo...
Let N(n < x: P) denote the number of positive integers n ^ x with the property P. In an earlier p...
A Lucas sequence is a binary recurrence sequences that includes as special cases, the Pell, the asso...
We define ψ‾ to be the multiplicative arithmetic function that satisfies for all primes p...
summary:Let $\mathbb {N}$ be the set of positive integers and let $s\in \mathbb {N}$. We denote by $...
summary:Let $[x]$ be an integer part of $x$ and $d(n)$ be the number of positive divisor of $n$. Ins...
Let {a_{1}(n)}_{n>1} be a purely periodic sequence of nonnegative integers, not identically zero, an...
1.) Let d(n) denote the number of divisors of n, logkn the k-fold iterated logarithm. It was shown b...
Let n be a positive integer, pd(n) denotes the product of all positive divisors of n, qd(n) denotes ...
In 2003 Cohen and Iannucci introduced a multiplicative arithmetic function D by assigning D(p a) = ...
Let I s consider the function d(i) = number of divisors of the positive integer number i. We have fo...
Let n be a positive integer, Pd(n) denotes the product of all positive divisors of n, qd(n) denotes ...
This thesis gives some order estimates and asymptotic formulae associated with general classes of no...
ABSTRACT. Let n be a positive integer, Pd(n) denotes the product of all positive divisors of n, qd(n...
Abstract Let n be any positive integer, Pd(n) denotes the product of all positive divisors of n. The...
A sequence of rational integers g is called a divisibility sequence if and only if n | m ⇒ g(n) | g...
Let N(n < x: P) denote the number of positive integers n ^ x with the property P. In an earlier p...
A Lucas sequence is a binary recurrence sequences that includes as special cases, the Pell, the asso...
We define ψ‾ to be the multiplicative arithmetic function that satisfies for all primes p...
summary:Let $\mathbb {N}$ be the set of positive integers and let $s\in \mathbb {N}$. We denote by $...
summary:Let $[x]$ be an integer part of $x$ and $d(n)$ be the number of positive divisor of $n$. Ins...
Let {a_{1}(n)}_{n>1} be a purely periodic sequence of nonnegative integers, not identically zero, an...
1.) Let d(n) denote the number of divisors of n, logkn the k-fold iterated logarithm. It was shown b...
Let n be a positive integer, pd(n) denotes the product of all positive divisors of n, qd(n) denotes ...
In 2003 Cohen and Iannucci introduced a multiplicative arithmetic function D by assigning D(p a) = ...
Let I s consider the function d(i) = number of divisors of the positive integer number i. We have fo...
Let n be a positive integer, Pd(n) denotes the product of all positive divisors of n, qd(n) denotes ...
This thesis gives some order estimates and asymptotic formulae associated with general classes of no...
ABSTRACT. Let n be a positive integer, Pd(n) denotes the product of all positive divisors of n, qd(n...
Abstract Let n be any positive integer, Pd(n) denotes the product of all positive divisors of n. The...
A sequence of rational integers g is called a divisibility sequence if and only if n | m ⇒ g(n) | g...
Let N(n < x: P) denote the number of positive integers n ^ x with the property P. In an earlier p...
A Lucas sequence is a binary recurrence sequences that includes as special cases, the Pell, the asso...
We define ψ‾ to be the multiplicative arithmetic function that satisfies for all primes p...