On the subclasses associated with the Bessel-Struve kernel functions

TL;DR

This paper explores the conditions under which normalized Bessel-Struve kernel functions belong to specific function classes and examines related linear operators involving the Bessel-Struve operator.

Contribution

It provides necessary and sufficient conditions for Bessel-Struve kernel functions to be in certain classes and analyzes associated linear operators.

Findings

Characterized classes $ ext{T}_ ext{lambda}( ext{alpha})$ and $ ext{L}_ ext{lambda}( ext{alpha})$ for Bessel-Struve functions

Derived conditions for functions to belong to these classes

Studied properties of linear operators involving the Bessel-Struve operator

Abstract

The article investigate the necessary and sufficient conditions for the normalized Bessel-struve kernel functions belonging to the classes $\mathcal{T}_\lambda(\alpha)$ , $\mathcal{L}_\lambda(\alpha)$. Some linear operators involving the Bessel-Struve operator are also considered.