@article {
author = {Nazir, Ishfaq and Mir, Mohammad and Wani, Irfan},
title = {On generalisation of Brown's conjecture},
journal = {International Journal of Nonlinear Analysis and Applications},
volume = {12},
number = {2},
pages = {1151-1155},
year = {2021},
publisher = {Semnan University},
issn = {2008-6822},
eissn = {2008-6822},
doi = {10.22075/ijnaa.2021.22265.2343},
abstract = {LetĀ $P$ be the complex polynomial of the form $P(z) = z \prod_{j=1}^{n-1}(z-z_{j})$, with $|z_{j}|\geq 1$, $1 \leq j \leq n-1.$ Then according to famous Brown's Conjecture $p'(z) \neq 0$, for $|z| < \frac{1}{n}.$ This conjecture was proved by Aziz and Zarger [1]. In this paper, we present some interesting generalisations of this conjecture and the results of severalĀ authors related to this conjecture.},
keywords = {Polynomial,disk,Zeros,Derivative,conjecture},
url = {https://ijnaa.semnan.ac.ir/article_5191.html},
eprint = {https://ijnaa.semnan.ac.ir/article_5191_42bbd804ea617d83fa8b45a21dde4061.pdf}
}