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Inclusion properties of Generalized Integral Transform using Duality Techniques

Complex Variables 2014-12-01 v1

Abstract

Let Wβδ(α,γ)\mathcal{W}_{\beta}^\delta(\alpha,\gamma) be the class of normalized analytic functions ff defined in the region z<1|z|<1 and satisfying \begin{align*} {\rm Re\,} e^{i\phi}\left(\dfrac{}{}(1\!-\!\alpha\!+\!2\gamma)\!\left({f}/{z}\right)^\delta +\left(\alpha\!-\!3\gamma+\gamma\left[\dfrac{}{}\left(1-{1}/{\delta}\right)\left({zf'}/{f}\right)+ {1}/{\delta}\left(1+{zf"}/{f'}\right)\right]\right)\right.\\ \left.\dfrac{}{}\left({f}/{z}\right)^\delta \!\left({zf'}/{f}\right)-\beta\right)>0, \end{align*} with the conditions α0\alpha\geq 0, β<1\beta<1, γ0\gamma\geq 0, δ>0\delta>0 and ϕR\phi\in\mathbb{R}. For a non-negative and real-valued integrable function λ(t)\lambda(t) with 01λ(t)dt=1\int_0^1\lambda(t) dt=1, the generalized non-linear integral transform is defined as \begin{align*} V_{\lambda}^\delta(f)(z)= \left(\int_0^1 \lambda(t) \left({f(tz)}/{t}\right)^\delta dt\right)^{1/\delta}. \end{align*} The main aim of the present work is to find conditions on the related parameters such that Vλδ(f)(z)Wβ1δ1(α1,γ1)V_\lambda^\delta(f)(z)\in\mathcal{W}_{\beta_1}^{\delta_1}(\alpha_1,\gamma_1), whenever fWβ2δ2(α2,γ2)f\in\mathcal{W}_{\beta_2}^{\delta_2}(\alpha_2,\gamma_2). Further, several interesting applications for specific choices of λ(t)\lambda(t) are discussed.

Keywords

Cite

@article{arxiv.1411.7877,
  title  = {Inclusion properties of Generalized Integral Transform using Duality Techniques},
  author = {Satwanti Devi and A. Swaminathan},
  journal= {arXiv preprint arXiv:1411.7877},
  year   = {2014}
}

Comments

14 pages. This is a work related to the generalized operator considered in two other work and submitted to Arxiv

R2 v1 2026-06-22T07:15:03.160Z