Analysis of certain determinants for a defined subclass of analytic functions using Poisson distribution series in petal shaped domain

Sangarambadi Padmanabhan VIJAYALAKSHMI; Martin MEHDHA; Saurabh PORWAL; Raman EZHILARASI; Thirumalai Vinjimur SUDHARSAN

doi:10.24193/subbmath.2026.2.04

Authors

Sangarambadi Padmanabhan VIJAYALAKSHMI Department of Mathematics, Dwaraka Doss Goverdhan Doss Vaishnav College, Chennai, India, e-mail: vijishreekanth@gmail.com https://orcid.org/0000-0003-3978-6760
Martin MEHDHA Research Scholar, University of Madras and Department of Mathematics, DRBCCC Hindu College, Pattabiram, Chennai, India, e-mail: mehdhamartin@gmail.com https://orcid.org/0009-0006-3035-3546
Saurabh PORWAL Department of Mathematics, Ram Sahai Governent Degree College, Bairi-Shivrajpur, Kanpur, Uttar Pradesh, India, e-mail: saurabhjcb@rediffmail.com https://orcid.org/0000-0003-0847-3550
Raman EZHILARASI Department of Mathematics, S.I.V.E.T College, Gowrivakkam, Chennai, India, e-mail: ezhilarasi2906@gmail.com https://orcid.org/0009-0004-9070-3187
Thirumalai Vinjimur SUDHARSAN Department of Mathematics, S.I.V.E.T College, Gowrivakkam, Chennai, India, e-mail: tvsudharsan@gmail.com https://orcid.org/0000-0002-6882-3367

DOI:

https://doi.org/10.24193/subbmath.2026.2.04

Keywords:

Toeplitz determinants, Poisson distribution series, starlike functions, petal-shaped domain

Abstract

The current study focuses on obtaining the sharp coefficient estimates and Fekete-Szegö inequality for the class Ψϑ(m, λ) and uses the Poisson distribution series to obtain the sharp estimates of coefficient inequalities, Fekete-Szegö inequality, second order Toeplitz determinants and upper bounds of third order Toeplitz determinants and second order Hankel determinants for a certain analytic function U(z) = z + δ2z² + δ3z³ + · · · , U(z) ̸= 0, z ∈ ∆ belonging to the class PΨ_ϑ(m, λ, Υ) = {U ∈ H : I^kU ∈ Ψ_ϑ(m, λ)}, m ∈ N0 = {0, 1, 2, · · · }, λ, ϑ ∈ N = {1, 2, ...}, Υ = Υ_i(k) = [kⁱ⁻¹/(i−1)!]e^−k, defined on the open unit disc (z ∈ Δ := {z : |z| < 1}).
This research could motivate others to delve deeper into the coefficient functional problem related to the Poisson distribution series of analytic functions across different categories of univalent functions.

Mathematics Subject Classification (2010): 30C45, 30C50.

Received 10 January 2026; Accepted 06 March 2026.

References

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Analysis of certain determinants for a defined subclass of analytic functions using Poisson distribution series in petal shaped domain

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