Results 191 to 200 of about 6,170 (215)
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INEQUALITIES FOR THE DERIVATIVE OF CERTAIN POLYNOMIALS
jnanabhaIn this article, we define the pseudo degree and pseudo edge degree in the FSG. We discuss the pseudo-regularity of fuzzy soft graphs and some of its properties based on the membership values of its subgraphs. FSG and its subgraphs, if fuzzy cycles of any length, then the result we obtain based on the membership values of edges and degrees is cleary ...
Kumar, Susheel +2 more
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Inequalities Concerning the Polar Derivative of a Polynomial
Bulletin of the Malaysian Mathematical Sciences Society, 2015zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Gulzar, Suhail, Rather, N. A.
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AN INEQUALITY FOR THE DERIVATIVE OF A POLYNOMIAL WITH REAL COEFFICIENTS
Mathematics of the USSR-Izvestiya, 1975For the derivative of a polynomial with real coefficients we obtain an inequality which involves the distribution of the zeros of the polynomial. It is shown that for polynomials with arbitrary complex coefficients the inequality holds only under additional hypotheses.Bibliography: 3 items.
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ON INTEGRAL INEQUALITIES FOR TRIGONOMETRIC POLYNOMIALS AND THEIR DERIVATIVES
Mathematics of the USSR-Izvestiya, 1982Die Arbeit besteht aus dem Beweis einer Reihe von Integralungleichungen für trigonometrische Polynome. Diese Sätze verallgemeinern klassische Resultate von S. N. Bernstein und A. Zygmund sowie neuere Ergebnisse, unter anderem von V. I. Ivanov, Akhiezer und Sokorozhenko, Krolov und Oswald.
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Sharp Pointwise Interpolation Inequalities for Derivatives
Functional Analysis and Its Applications, 2002The authors present some sharp inequalities for the gradient of \(u\in L_1^{\text{loc}} (\mathbb{R}^n)\) generalizing the classical one-dimensional E. Landau inequality. The following result is typical. Let \(\alpha>0\) and \(u\in C^1(\mathbb{R}^n)\). Then \[ |\nabla u(x)|\leq C[({\mathcal M}u) (x)]^{1/ \alpha+1} \Biggl( \sup_{r>0} \frac{|\nabla u(x)- (
Maz'ya, V. G., Shaposhnikova, T. O.
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Inequalities for the Derivatives of Polynomials
Mathematics Magazine, 1969(1969). Inequalities for the Derivatives of Polynomials. Mathematics Magazine: Vol. 42, No. 4, pp. 165-174.
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Lyapunov type inequality in the frame of generalized Caputo derivatives
Discrete and Continuous Dynamical Systems - Series S, 2021Fahd Jarad +2 more
exaly
New extensions of Hermite-Hadamard inequality using k−fractional Caputo derivatives
Advanced Studies: Euro-Tbilisi Mathematical Journal, 2023BAHTIYAR Bayraktar
exaly
An Inequality Involving Derivatives
Bulletin of the London Mathematical Society, 1970openaire +2 more sources
Inequalities for the Logarithmic Derivatives of a Polynomial
Journal of the London Mathematical Society, 1940Macintyre, Archibald J., Fuchs, W. H. J.
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