Gauss Lucas theorem and Bernstein-type inequalities for polynomials

Ali Liyaqat; Rather N. A.; Gulzar Suhail

doi:10.2478/ausm-2022-0013

Acta Universitatis Sapientiae: Mathematica (Dec 2022)

Gauss Lucas theorem and Bernstein-type inequalities for polynomials

Ali Liyaqat,
Rather N. A.,
Gulzar Suhail

Affiliations

Ali Liyaqat: P. G. Department of Mathematics, Kashmir University, Hazratbal, Srinagar-190006, India
Rather N. A.: P. G. Department of Mathematics, Kashmir University, Hazratbal, Srinagar-190006, India
Gulzar Suhail: Department of Mathematics, Government College for Engineering & TechnologyGanderbal, J& K

DOI: https://doi.org/10.2478/ausm-2022-0013
Journal volume & issue: Vol. 14, no. 2
pp. 211 – 219

Abstract

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According to Gauss-Lucas theorem, every convex set containing all the zeros of a polynomial also contains all its critical points. This result is of central importance in the geometry of critical points in the analytic theory of polynomials. In this paper, an extension of Gauss-Lucas theorem is obtained and as an application some generalizations of Bernstein-type polynomial inequalities are also established.

Published in Acta Universitatis Sapientiae: Mathematica

ISSN: 2066-7752 (Online)
Publisher: Scientia Publishing House
Country of publisher: Romania
LCC subjects: Science: Mathematics
Website: https://acta.sapientia.ro/en/series/mathematica

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