On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ
Yıl: 2023 Cilt: 47 Sayı: 1 Sayfa Aralığı: 98 - 109 Metin Dili: İngilizce DOI: 10.55730/1300-0098.3348 İndeks Tarihi: 14-03-2024
On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ
Öz: Using (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ, we defined a new subclass of biunivalent functions. We obtained coefficient inequalities for functions belonging to the new subclass. In addition to these results, the upper bound for the Fekete-Szegö functional was obtained. Finally, for some special values of parameters, several corollaries were presented.
Anahtar Kelime: Belge Türü: Makale Makale Türü: Araştırma Makalesi Erişim Türü: Erişime Açık
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| APA | ORHAN H, Aktaş İ, ARIKAN H (2023). On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ. , 98 - 109. 10.55730/1300-0098.3348 |
| Chicago | ORHAN Halit,Aktaş İbrahim,ARIKAN Hava On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ. (2023): 98 - 109. 10.55730/1300-0098.3348 |
| MLA | ORHAN Halit,Aktaş İbrahim,ARIKAN Hava On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ. , 2023, ss.98 - 109. 10.55730/1300-0098.3348 |
| AMA | ORHAN H,Aktaş İ,ARIKAN H On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ. . 2023; 98 - 109. 10.55730/1300-0098.3348 |
| Vancouver | ORHAN H,Aktaş İ,ARIKAN H On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ. . 2023; 98 - 109. 10.55730/1300-0098.3348 |
| IEEE | ORHAN H,Aktaş İ,ARIKAN H "On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ." , ss.98 - 109, 2023. 10.55730/1300-0098.3348 |
| ISNAD | ORHAN, Halit vd. "On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ". (2023), 98-109. https://doi.org/10.55730/1300-0098.3348 |
| APA | ORHAN H, Aktaş İ, ARIKAN H (2023). On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ. Turkish Journal of Mathematics, 47(1), 98 - 109. 10.55730/1300-0098.3348 |
| Chicago | ORHAN Halit,Aktaş İbrahim,ARIKAN Hava On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ. Turkish Journal of Mathematics 47, no.1 (2023): 98 - 109. 10.55730/1300-0098.3348 |
| MLA | ORHAN Halit,Aktaş İbrahim,ARIKAN Hava On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ. Turkish Journal of Mathematics, vol.47, no.1, 2023, ss.98 - 109. 10.55730/1300-0098.3348 |
| AMA | ORHAN H,Aktaş İ,ARIKAN H On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ. Turkish Journal of Mathematics. 2023; 47(1): 98 - 109. 10.55730/1300-0098.3348 |
| Vancouver | ORHAN H,Aktaş İ,ARIKAN H On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ. Turkish Journal of Mathematics. 2023; 47(1): 98 - 109. 10.55730/1300-0098.3348 |
| IEEE | ORHAN H,Aktaş İ,ARIKAN H "On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ." Turkish Journal of Mathematics, 47, ss.98 - 109, 2023. 10.55730/1300-0098.3348 |
| ISNAD | ORHAN, Halit vd. "On a new subclass of biunivalent functions associated with the (p, q)-Lucas polynomials and bi-Bazilevic̆ type functions of order ρ + iξ". Turkish Journal of Mathematics 47/1 (2023), 98-109. https://doi.org/10.55730/1300-0098.3348 |
