Let P(z) be a polynomial of degree n, having all its zeros in |z|≤ 1. In this paper, we estimate kth polar derivative of P(z) on |z| = 1 and thereby obtain compact generalizations of some known results which ...Let P(z) be a polynomial of degree n, having all its zeros in |z|≤ 1. In this paper, we estimate kth polar derivative of P(z) on |z| = 1 and thereby obtain compact generalizations of some known results which among other things yields a refinement of a result due to Paul Tura'n.展开更多
Let P(z) be a polynomial of degree n having no zeros in |z|〈 1, then for every real or complex number β with |β|≤ 1, and |z| = 1, R ≥ 1, it is proved by Dewan et al. [4] that|P(Rz)+β(R+1/2)^nP(z...Let P(z) be a polynomial of degree n having no zeros in |z|〈 1, then for every real or complex number β with |β|≤ 1, and |z| = 1, R ≥ 1, it is proved by Dewan et al. [4] that|P(Rz)+β(R+1/2)^nP(z)|≤1/2{(|R^n+β(R+1/2)^n|+|1+β(R+1/2)^n|max|z|=1|P(z)| -(|R^n+β(R+1/2)^n|-|1+β(R+1/2)^n|max|z|=1|P(z)|}.In this paper we generalize the above inequality for polynomials having no zeros in }z} 〈 k, k ≤ 1. Our results generalize certain well-known polynomial inequalities.展开更多
Let P(z) be a polynomial of degree n and for any complex number α, let D;P(z) = nP(z)+(α- z) P′(z) denote the polar derivative of the polynomial P(z) with respect to α. In this paper, we obtain inequal...Let P(z) be a polynomial of degree n and for any complex number α, let D;P(z) = nP(z)+(α- z) P′(z) denote the polar derivative of the polynomial P(z) with respect to α. In this paper, we obtain inequalities for the polar derivative of a polynomial having all zeros inside a circle. Our results shall generalize and sharpen some well-known results of Turan, Govil, Dewan et al. and others.展开更多
Let p(z) be a polynomial of degree n, which has no zeros in |z|〈 1, Dewan et al. [K. K. Dewan and Sunil Hans, Generalization of certain well known polynomial inequalities, J. Math. Anal. Appl., 363 (2010), pp. ...Let p(z) be a polynomial of degree n, which has no zeros in |z|〈 1, Dewan et al. [K. K. Dewan and Sunil Hans, Generalization of certain well known polynomial inequalities, J. Math. Anal. Appl., 363 (2010), pp. 38-41] established|zp'(z)+nβ/2p(z)|≤n/2{(|β/2|+|1+β/2|)|z|=1max|p(z)|-(|1+β/2|-|β/2|)|z|=1min|p(z)|},for any |β|≤ 1 and |z| = 1. In this paper we improve the above inequality for the polynomial which has no zeros in |z| 〈 k, k≥ 1, except s-fold zeros at the origin. Our results generalize certain well known polynomial inequalities.展开更多
文摘Let P(z) be a polynomial of degree n, having all its zeros in |z|≤ 1. In this paper, we estimate kth polar derivative of P(z) on |z| = 1 and thereby obtain compact generalizations of some known results which among other things yields a refinement of a result due to Paul Tura'n.
文摘Let P(z) be a polynomial of degree n having no zeros in |z|〈 1, then for every real or complex number β with |β|≤ 1, and |z| = 1, R ≥ 1, it is proved by Dewan et al. [4] that|P(Rz)+β(R+1/2)^nP(z)|≤1/2{(|R^n+β(R+1/2)^n|+|1+β(R+1/2)^n|max|z|=1|P(z)| -(|R^n+β(R+1/2)^n|-|1+β(R+1/2)^n|max|z|=1|P(z)|}.In this paper we generalize the above inequality for polynomials having no zeros in }z} 〈 k, k ≤ 1. Our results generalize certain well-known polynomial inequalities.
文摘Let P(z) be a polynomial of degree n and for any complex number α, let D;P(z) = nP(z)+(α- z) P′(z) denote the polar derivative of the polynomial P(z) with respect to α. In this paper, we obtain inequalities for the polar derivative of a polynomial having all zeros inside a circle. Our results shall generalize and sharpen some well-known results of Turan, Govil, Dewan et al. and others.
文摘Let p(z) be a polynomial of degree n, which has no zeros in |z|〈 1, Dewan et al. [K. K. Dewan and Sunil Hans, Generalization of certain well known polynomial inequalities, J. Math. Anal. Appl., 363 (2010), pp. 38-41] established|zp'(z)+nβ/2p(z)|≤n/2{(|β/2|+|1+β/2|)|z|=1max|p(z)|-(|1+β/2|-|β/2|)|z|=1min|p(z)|},for any |β|≤ 1 and |z| = 1. In this paper we improve the above inequality for the polynomial which has no zeros in |z| 〈 k, k≥ 1, except s-fold zeros at the origin. Our results generalize certain well known polynomial inequalities.
