On the location of zeros of complex polynomials.
Dehmer, Matthias (2006)
JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]
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Displaying similar documents to “An operator preserving inequalities between polynomials.”
On the location of zeros of complex polynomials.
Inequalities for the maximum modulus of the derivative of a polynomial.
Aziz, A., Zafar, Fiza (2007)
JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]
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Generalization of the Grace–Heawood Theorem
Radoš Bakić (2013)
Publications de l'Institut Mathématique
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Location of zeros of infrapolynomials
T. S. Motzkin, J. L. Walsh (1959-1960)
Compositio Mathematica
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Zero and coefficient inequalities for hyperbolic polynomials.
Rubió-Massegú, J., Díaz-Barrero, José Luis, Rubió-Díaz, P. (2006)
JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]
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Inequalities for the polar derivative of a polynomial.
Dewan, K.K., Upadhye, C.M. (2008)
JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]
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On growth of polynomials.
Govil, N.K. (2002)
Journal of Inequalities and Applications [electronic only]
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Integral mean estimates for polynomials whose zeros are within a circle.
Dewan, K.K., Mir, Abdullah, Yadav, R.S. (2001)
International Journal of Mathematics and Mathematical Sciences
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On maximum modulus for the derivative of a polynomial
K. Dewan, Sunil Hans (2009)
Annales UMCS, Mathematica
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If P(z) is a polynomial of degree n, having all its zeros in the disk [...] then it was shown by Govil [Proc. Amer. Math. Soc. 41, no. 2 (1973), 543-546] that [...] In this paper, we obtain generalization as well as improvement of above inequality for the polynomial of the type [...] Also we generalize a result due to Dewan and Mir [Southeast Asian Bull. Math. 31 (2007), 691-695] in this direction.
Rate of growth of polynomials not vanishing inside a circle.
Gardner, Robert B., Govil, N.K., Musukula, Srinath R. (2005)
JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]
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A generalization of the Gauss-Lucas theorem
J. L. Díaz-Barrero, J. J. Egozcue (2008)
Czechoslovak Mathematical Journal
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Given a set of points in the complex plane, an incomplete polynomial is defined as the one which has these points as zeros except one of them. The classical result known as Gauss-Lucas theorem on the location of zeros of polynomials and their derivatives is extended to convex linear combinations of incomplete polynomials. An integral representation of convex linear combinations of incomplete polynomials is also given.