Sharpening of Turán-Type Inequality for Polynomials

IF 0.5 Q3 MATHEMATICS Russian Mathematics Pub Date : 2024-08-06 DOI:10.3103/s1066369x24700269
N. A. Rather, A. Bhat, M. Shafi
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引用次数: 0

Abstract

For the polynomial \(P(z) = \sum\nolimits_{j = 0}^n {{c}_{j}}{{z}^{j}}\) of degree n having all its zeros in \({\text{|}}z{\text{|}} \leqslant k\), \(k \geqslant 1\), Jain in “On the derivative of a polynomial,” Bull. Math. Soc. Sci. Math. Roumanie Tome 59, 339–347 (2016) proved that \(\mathop {\max }\limits_{|z| = 1} {\text{|}}P'(z){\text{|}} \geqslant n\left( {\frac{{{\text{|}}{{c}_{0}}{\text{|}} + \,{\text{|}}{{c}_{n}}{\text{|}}{{k}^{{n + 1}}}}}{{{\text{|}}{{c}_{0}}{\text{|}}(1 + {{k}^{{n + 1}}}) + \,{\text{|}}{{c}_{n}}{\text{|}}({{k}^{{n + 1}}} + {{k}^{{2n}}})}}} \right)\mathop {\max }\limits_{|z| = 1} {\text{|}}P(z){\text{|}}.\) In this paper we strengthen the above inequality and other related results for the polynomials of degree \(n \geqslant 2\).

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锐化多项式的图兰式不等式
AbstractFor the polynomial \(P(z) = \sum\nolimits_{j = 0}^n {{c}_{j}}{{z}^{j}}\) of degree n having its all zeros in \({\text{|}}z{text{|}} \leqslant k\), \(k \geqslant 1\), Jain in "On the derivative of a polynomial," Bull.Math.Soc.Roumanie Tome 59, 339-347 (2016) proved that\(\mathop {\max }\limits_{|z| = 1}.{\text{|}}P'(z){\text{|}}\ungeqslant n\left( {\frac{{{\text{|}}{{c}_{0}}{\text{|}}+ \,{\text{|}}{{c}_{n}}{text{|}}{{k}^{n + 1}}}}}{{{{\text{|}}{{c}_{0}}{{text{|}}(1 + {{k}^{n + 1}}}) + \,{\text{|}}{{c}_{n}}{\text{|}}({{k}^{{n + 1}}} + {{k}^{2n}}})}}}}\right)\mathop {\max }\limits_{|z| = 1}{在本文中,我们将加强上述不等式和其他相关结果,用于度 \(n \geqslant 2\) 的多项式。
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来源期刊
Russian Mathematics
Russian Mathematics MATHEMATICS-
CiteScore
0.90
自引率
25.00%
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0
期刊介绍: Russian Mathematics  is a peer reviewed periodical that encompasses the most significant research in both pure and applied mathematics.
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