Hankel Determinant H2(3) for Certain Subclasses of Univalent Functions
Let S to be the class of functions which are analytic, normalized and univalent in the unit disk U = {z : |z| < 1}. The main subclasses of S are starlike functions, convex functions, close-to-convex functions, quasiconvex functions, starlike functions with respect to (w.r.t.) symmetric points and...
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| Online Access: | https://eprints.ums.edu.my/id/eprint/26284/1/Hankel%20Determinant%20H2%283%29%20for%20Certain%20Subclasses%20of%20Univalent%20Functions.pdf https://eprints.ums.edu.my/id/eprint/26284/2/Hankel%20Determinant%20H2%283%29%20for%20Certain%20Subclasses%20of%20Univalent%20Functions1.pdf https://eprints.ums.edu.my/id/eprint/26284/ https://doi.org/10.13189/ms.2020.080510 |
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my.ums.eprints.262842021-01-15T08:19:19Z https://eprints.ums.edu.my/id/eprint/26284/ Hankel Determinant H2(3) for Certain Subclasses of Univalent Functions Andy Liew Pik Hern Aini Janteng Rashidah Omar Q Science (General) Let S to be the class of functions which are analytic, normalized and univalent in the unit disk U = {z : |z| < 1}. The main subclasses of S are starlike functions, convex functions, close-to-convex functions, quasiconvex functions, starlike functions with respect to (w.r.t.) symmetric points and convex functions w.r.t. symmetric points which are denoted by S ∗ , K, C, C ∗ , S ∗ S , and KS respectively. In recent past, a lot of mathematicians studied about Hankel determinant for numerous classes of functions contained in S. The qth Hankel determinant for q ≥ 1 and n ≥ 0 is defined by Hq(n). H2(1) = a3 − a2 2 is greatly familiar so called Fekete-Szego functional. It has been discussed ¨ since 1930’s. Mathematicians still have lots of interest to this, especially in an altered version of a3 − µa2 2 . Indeed, there are many papers explore the determinants H2(2) and H3(1). From the explicit form of the functional H3(1), it holds H2(k) provided k from 1-3. Exceptionally, one of the determinant that is H2(3) = a3a5 − a4 2 has not been discussed in many times yet. In this article, we deal with this Hankel determinant H2(3) = a3a5 − a4 2 . From this determinant, it consists of coefficients of function f which belongs to the classes S ∗ S and KS so we may find the bounds of |H2(3)| for these classes. Likewise, we got the sharp results for S ∗ S and KS for which a2 = 0 are obtained. 2020 Article PeerReviewed text en https://eprints.ums.edu.my/id/eprint/26284/1/Hankel%20Determinant%20H2%283%29%20for%20Certain%20Subclasses%20of%20Univalent%20Functions.pdf text en https://eprints.ums.edu.my/id/eprint/26284/2/Hankel%20Determinant%20H2%283%29%20for%20Certain%20Subclasses%20of%20Univalent%20Functions1.pdf Andy Liew Pik Hern and Aini Janteng and Rashidah Omar (2020) Hankel Determinant H2(3) for Certain Subclasses of Univalent Functions. Mathematics and Statistics, 8 (5). 566 -569. https://doi.org/10.13189/ms.2020.080510 |
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Q Science (General) Andy Liew Pik Hern Aini Janteng Rashidah Omar Hankel Determinant H2(3) for Certain Subclasses of Univalent Functions |
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Let S to be the class of functions which are analytic, normalized and univalent in the unit disk U = {z : |z| < 1}. The main subclasses of S are starlike functions, convex functions, close-to-convex functions, quasiconvex functions, starlike functions with respect to (w.r.t.) symmetric points and convex functions w.r.t. symmetric points which are denoted by S ∗ , K, C, C ∗ , S ∗ S , and KS respectively. In recent past, a lot of mathematicians studied about Hankel determinant for numerous classes of functions contained in S. The qth Hankel determinant for q ≥ 1 and n ≥ 0 is defined by Hq(n). H2(1) = a3 − a2 2 is greatly familiar so called Fekete-Szego functional. It has been discussed ¨ since 1930’s. Mathematicians still have lots of interest to this, especially in an altered version of a3 − µa2 2 . Indeed, there are many papers explore the determinants H2(2) and H3(1). From the explicit form of the functional H3(1), it holds H2(k) provided k from 1-3. Exceptionally, one of the determinant that is H2(3) = a3a5 − a4 2 has not been discussed in many times yet. In this article, we deal with this Hankel determinant H2(3) = a3a5 − a4 2 . From this determinant, it consists of coefficients of function f which belongs to the classes S ∗ S and KS so we may find the bounds of |H2(3)| for these classes. Likewise, we got the sharp results for S ∗ S and KS for which a2 = 0 are obtained. |
| format |
Article |
| author |
Andy Liew Pik Hern Aini Janteng Rashidah Omar |
| author_facet |
Andy Liew Pik Hern Aini Janteng Rashidah Omar |
| author_sort |
Andy Liew Pik Hern |
| title |
Hankel Determinant H2(3) for Certain Subclasses of Univalent Functions |
| title_short |
Hankel Determinant H2(3) for Certain Subclasses of Univalent Functions |
| title_full |
Hankel Determinant H2(3) for Certain Subclasses of Univalent Functions |
| title_fullStr |
Hankel Determinant H2(3) for Certain Subclasses of Univalent Functions |
| title_full_unstemmed |
Hankel Determinant H2(3) for Certain Subclasses of Univalent Functions |
| title_sort |
hankel determinant h2(3) for certain subclasses of univalent functions |
| publishDate |
2020 |
| url |
https://eprints.ums.edu.my/id/eprint/26284/1/Hankel%20Determinant%20H2%283%29%20for%20Certain%20Subclasses%20of%20Univalent%20Functions.pdf https://eprints.ums.edu.my/id/eprint/26284/2/Hankel%20Determinant%20H2%283%29%20for%20Certain%20Subclasses%20of%20Univalent%20Functions1.pdf https://eprints.ums.edu.my/id/eprint/26284/ https://doi.org/10.13189/ms.2020.080510 |
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13.211869 |