Properties for Close-to-Convex and Quasi-Convex Functions Using q-Linear Operator

E. E. Ali ^{1, 2}

R. M. EL-Ashwah ³

Abeer M Albalahi ¹

Wael mohammed ^{1, 4}

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Department of Mathematics, College of Science, University of Ha’il, Ha’il 2440, Saudi Arabia |

Department of Mathematics and Computer Science, Faculty of Science, Port Said University, Port Said 42521, Egypt |

Department of Mathematics, Faculty of Science, Damietta University, New Damietta 34517, Egypt |

⁴

Department of Mathematics, Faculty of science, Mansoura University, Mansoura 35516, Egypt |

Publication type: Journal Article

Publication date: 2025-03-07

MDPI

Journal: Mathematics

scimago Q2

SJR: 0.475

CiteScore: 4.0

Impact factor: 2.3

ISSN: 22277390

DOI: 10.3390/math13060900

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Abstract

In this work, we describe the q-analogue of a multiplier–Ruscheweyh operator of a specific family of linear operators Iq,ρs(ν,τ), and we obtain findings related to geometric function theory (GFT) by utilizing approaches established through subordination and knowledge of q-calculus operators. By using this operator, we develop generalized classes of quasi-convex and close-to-convex functions in this paper. Additionally, the classes Kq,ρs(ν,τ)φ, Qq,ρs(ν,τ)φ are introduced. The invariance of these recently formed classes under the q-Bernardi integral operator is investigated, along with a number of intriguing inclusion relationships between them. Additionally, several unique situations and the beneficial outcomes of these studies are taken into account.