Owa, ShigeyoshiGüney, Hatun Özlem2021-07-022021-07-022020Owa, S. ve Güney, H. Ö. ve (2020). New applications of the Bernardi integral operator. Mathematics, 8(7), 1180.2227-7390https://www.mdpi.com/2227-7390/8/7/1180https://hdl.handle.net/11468/7200WOS:000558043500001Let A(p, n) be the class of f (z) which are analytic p-valent functions in the closed unit disk U = {z ∈ C: |z| ≤ 1}. The expression B-m-λf(z) is defined by using fractional integrals of order l for f (z) ∈ A(p, n). When m = 1 and l = 0, B-1 f (z) becomes Bernardi integral operator. Using the fractional integral B-m-λ f (z), the subclass Tp, n (αs, β, ρ; m, λ) of A(p, n) is introduced. In the present paper, we discuss some interesting properties for f (z) concerning with the class Tp, n (αs, β, ρ; m, λ). Also, some interesting examples for our results will be considered.eninfo:eu-repo/semantics/openAccessAnalytic p-valent functionBernardi integral operatorFractional integralGamma functionLibera integral operatorMiller-Mocanu lemmaArticle871180WOS:0005580435000012-s2.0-8508859378010.3390/math8071180Q2Q1