Quaternionic Generalization of the Enestr\"om-Kakeya Theorem
Abstract
In 2020, Carney et.al. proved the quaternionic version of the Enestr\"om-Kakeya Theorem, which states that a polynomial p(q)=Σ=0n q a with non-negative and monotonically increasing coefficients (0<a0 a1 ·s an) has all of its zeros within the unit ball |q| 1. Numerous generalizations of Enestr\"om-Kakeya Theorem are available in the literatures (m-mmr). In this paper, we extend some of these generalizations to the quaternionic context and present several potential results.
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