Advanced search
Publication Cover
Applied Mathematics in Science and Engineering Volume 30, 2022 - Issue 1
Submit an article Journal homepage
1,337
Views
5
CrossRef citations to date
0
Altmetric
Research Article

Applications of q-derivative operator to subclasses of bi-univalent functions involving Gegenbauer polynomials

Qiuxia Hua Department of Mathematics, Luoyang Normal University, Luoyang, People's Republic of ChinaView further author information
,
Timilehin Gideon Shabab Department of Mathematics, University of Ilorin, Ilorin, NigeriaView further author information
,
Jihad Younisc Department of Mathematics, Aden University, Aden, YemenCorrespondence[email protected]
View further author information
,
Bilal Khand School of Mathematical Sciences and Shanghai Key Laboratory of PMMP, East China Normal University, Shanghai, People's Republic of ChinaORCID Iconhttps://orcid.org/0000-0003-2427-2003View further author information
ORCID Icon,
Wali Khan Mashwanie Institute of Numerical Sciences, Kohat University of Science and Technology, Kohat, PakistanORCID Iconhttps://orcid.org/0000-0002-5081-741XView further author information
ORCID Icon &
Murat Çağlarf Department of Mathematics Faculty of Science, Erzurum Technical University, Erzurum, TurkeyView further author information
Pages 501-520 | Received 17 Jan 2022, Accepted 04 Jun 2022, Published online: 21 Jun 2022

References

  • Lewin M. On a coefficient problem for bi-univalent functions. Proc Am Math Soc. 1967;18(1):63–68.
  • Brannan DA, Clunie JG. Aspect of contemporary complex analysis. Proceedings of the NATO Advanced Study Institute Held at the University of Durham, Durham; 1979 July 1–20. New York and London: Academic Press; 1980.
  • Netanyahu E. The minimal distance of the image boundary from the origin and the second coefficient of a univalent function in |z|<1. Arch Ration Mech Anal. 1969;32:100–112.
  • Brannan DA, Taha T. On some classes of bi-univalent functions. Babes-Bolyai Math. 1986;31(2):70–77.
  • Jackson FH. On q-definite integrals. Q J Pure Appl Math. 1910;41:193–203.
  • Jackson FH. On q-definite integrals on q-functions and a certain difference operator. Trans R Soc Edinb. 1908;46:253–281.
  • Seoudy TM, Aouf MK. Convolution properties for C certain classes of analytic functions defined by q-derivative operator. Abstr Appl Anal. 2014;2014:Article ID 846719, 7 pages.
  • Srivastava HM. Univalent functions, fractional calculus, and associated generalized hypergeometric functions. In: Srivastava HM, Owa S, editors. Univalent functions, fractional calculus, and their applications. New York: John Wiley & Sons; 1989.
  • Srivastava HM. Operators of basic (or q-) calculus and fractional q-calculus and their applications in geometric function theory of complex analysis. Iran J Sci Technol Trans A: Sci. 2020;44:327–344.
  • Ahmad QZ, Khan N, Raza M, et al. Certain q-difference operators and their applications to the subclass of meromorphic q-starlike functions. Filomat. 2019;33(11):3385–3397.
  • Ahmad B, Khan MG, Frasin BA, et al. On q-analogue of meromorphic multivalent functions in Lemniscate of Bernoulli domain. AIMS Math. 2021;6:3037–3052.
  • Ahmad B, Khan MG, Darus M, et al. Applications of some generalized Janowski meromorphic multivalent functions. J Math. 2021;2021:Article ID 6622748, 13 pages.
  • Shi L, Ahmad B, Khan N, et al. Coefficient estimates for a subclass of meromorphic multivalent q-close-to-convex functions. Symmetry. 2021;13:1840.
  • Khan B, Liu Z-G, Srivastava HM, et al. Applications of higher-order derivatives to subclasses of multivalent q-starlike functions. Maejo Int J Sci Technol. 2021;15(1):61–72.
  • Rehman MS, Ahmad QZ, Khan B, et al. Generalisation of certain subclasses of analytic and univalent functions. Maejo Int J Sci Technol. 2019;13(1):1–9.
  • Fekete M, Szego G. Eine bemerkung uber ungerade schlichte funktionen. J Lond Math Soc. 1933;s1–8:85–89.
  • Noonan JW, Thomas DK. On the second Hankel determinant of areally mean p-valent functions. Trans Am Math Soc. 1976;223:337–346.
  • Noor KI. Hankel determinant problem for the class of functions with bounded boundary rotation. Rev Roum Math Pures Appl. 1983;28(8):731–739.
  • Duren PL. Univalent functions. New York (NY): Springer; 1983. (Grundlehrender Mathematischer Wissencchaffer; 259).
  • Janteng A, Halim SA, Darus M. Hankel determinant for starlike and convex functions. Int J Math Anal. 2007;1(13):619–625.
  • MacGregor TH. Functions whose derivative have a positive real part. Trans Am Math Soc. 1962;104(3):532–537.
  • Reddy TR, Vamshee Krishna D. Hankel determinant for starlike and convex functions with respect to symmetric points. J Indian Math Soc. 2012;79:161–171.
  • Lee SK, Ravichandran V, Supramaniam S. Bounds for the second Hankel determinant of certain univalent functions. J Inequal Appl. 2013;2013(1):1–17.
  • Mishra AK, Gochhayat P. Second Hankel determinant for a class of analytic functions defined by fractional derivative. Int J Math Math Sci. 2008;2008:Article ID 153280.
  • Deniz E, Caglar M, Orhan H. Second Hankel determinant for bi-starlike and bi-convex functions of order β. Appl Math Comput. 2015;271:301–307.
  • Altnkaya S, Yalcan S. Construction of second Hankel determinant for a new subclass of bi-univalent functions. Turk J Math. 2018;42(6):2876–2884. doi:10.3906/mat-1507-39
  • Caglar M, Deniz E, Srivastava HM. Second Hankel determinant for certain subclasses of bi-univalent functions. Turkish J Math. 2017;41(3):694–706.
  • Kanas S, Analouei Adegani EA, Zireh A. An unified approach to second Hankel determinant of bisubordinate functions. Mediterr J Math. 2017;14(6):233.
  • Orhan H, Magesh N, Yamini J. Bounds for the second Hankel determinant of certain bi-univalent functions. Turkish J Math. 2016;40(3):679–687.
  • Bayad A, Kim T. Identities involving values of Bernstein, q-Bernoulli, and q-Euler polynomials. Russ J Math Phys. 2011;18(2):133–143.
  • De Vicente JI, Gandy S, Sánchez-Ruiz J. Information entropy of Gegenbauer polynomials of integer parameter. J Phys A Math Theor. 2007;40:8345–8361.
  • Khan B, Liu Z-G, Shaba TG, et al. Applications of Q-derivative operator to the subclass of bi-univalent functions involving q-Chebyshev polynomials. J Math. 2022;2022:Article ID 8162182, 7 pages.
  • Khan S, Al-Gonah AA, Yasmin G. Generalized and mixed type Gegenbauer polynomials. J Math Anal Appl. 2012;390(1):197–207.
  • Shah M. Applications of Gegenbauer (ultraspherical) polynomials in cooling of a heated cylinder. An Univ Timisoara Ser Sti Mat. 1970;8:207–212.
  • Unyong B, Govindan V, Bowmiya S, et al. Generalized linear differential equation using Hyers–Ulam stability approach. AIMS Math. 2021;6(2):1607–1623.
  • Akgul A, Sakar FM. A certain subclass of bi-univalent analytic functions introduced by means of the q-analogue of Noor integral operator and Horadam polynomials. Turk J Math. 2019;43:2275–2286.
  • Özkoç A, Porsuk A. A note for the (p,q)-Fibonacci and Lucas quaternion polynomials. Konuralp J Math. 2017;5(2):36–46.
  • Patil AB, Shaba TG. On sharp Chebyshev polynomial bounds for general subclass of bi-univalent functions. Appl Sci. 2021;23:109–117.
  • Libera RJ, Zlotkiewicz EJ. Coefficient bounds for the inverse of a function with derivative. Proc Am Math Soc. 1983;87:251–257.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.