Some properties of specially multiplicative functions

The study of the distribution of general multiplicative functions on arithmetic progressions is, largely, an open problem. We consider the simplest instance of this problem and establish an essentially the best possible result of the form where f is a nonnegative multiplicative function and (a, q)=

## Abstract Certain subclasses 𝒜~__p__~(__j__, α), ℬ︁~__p__~(__j__, α) and 𝒢~__p,b__~(__j__, α) of multivalent functions in the unit disk are introduced. The object of the present paper is to derive some properties of functions belonging to the classes 𝒜~__p__~(__j__, α), ℬ︁~__p__~(__j__, α), or 𝒢~

The object of the present paper is to derive some properties of certain multivalent functions in the unit disk. A conjecture for certain multivalent functions will be given.

This paper considers the Riemann-Liouville fractional operator as a tool to reduce linear ordinary equations with variable coefficients to simpler problems, avoiding the singularities of the original equation. The main result is that this technique allow us to obtain an extension of the classical in