Güney, Hatun ÖzlemOwa, Shigeyoshi2021-06-302021-06-302020Güney, H. Ö. ve Owa, S. (2020). Generalized operator for Alexander integral operator. Sciendo, 12(2), 294-306.1844-60942066-7752https://www.sciendo.com/article/10.2478/ausm-2020-0021https://hdl.handle.net/11468/7184WOS:000597405600007LetTnbe the class of functionsfwhich are defined by apower seriesf(z) =z+an+1zn+1+an+2zn+2+...for everyzin the closed unit discU.Withmdifferent boundary pointszs,(s=1,2,...,m),we considerαm∈eiβA−j−λf(U),hereA−j−λis thegeneralized Alexander integral operator andUis the open unit disc. Ap-plyingA−j−λ,a subclassBn(αm,β,ρ;j,λ)ofTnis defined with fractionalintegral for functionsf.The object of present paper is to consider someinteresting properties offto be inBn(αm,β,ρ;j,λ)eninfo:eu-repo/semantics/openAccessAnalytic functionAlexander integral operatorFractional inte-gralGamma functionMiller and Mocanu lemmaArticle122294306WOS:0005974056000072-s2.0-8509951878810.2478/ausm-2020-0021Q3N/A