Let Pn be the class of polynomials of degree at most n. Rather and Shah [15] proved that if P∈Pn and P(z) 6=0 in|z|〈1, then for every R〉0 and 0≤q〈∞,|B[P(Rz)]|q≤|RnB[zn]+λ0|q|1+zn|q |P(z)|q, w...Let Pn be the class of polynomials of degree at most n. Rather and Shah [15] proved that if P∈Pn and P(z) 6=0 in|z|〈1, then for every R〉0 and 0≤q〈∞,|B[P(Rz)]|q≤|RnB[zn]+λ0|q|1+zn|q |P(z)|q, where B is a Bn-operator. In this paper, we prove some generalization of this result which in particular yield-s some known polynomial inequalities as special. We also consider an operator Dαwhich maps a polynomial P(z) into DαP(z):=nP(z)+(α-z)P′(z) and obtain exten-sions and generalizations of a number of well-known Lq inequalities.展开更多
Let be the class of polynomials of degree n and a family of operators that map into itself. For , we investigate the dependence of on the maximum modulus of on for arbitrary real or complex numbers , with , and , and ...Let be the class of polynomials of degree n and a family of operators that map into itself. For , we investigate the dependence of on the maximum modulus of on for arbitrary real or complex numbers , with , and , and present certain sharp operator preserving inequalities between polynomials.展开更多
For a polynomial p(z) 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), 38-41...For a polynomial p(z) 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), 38-41) establishedfor any complex number β with |β|≤ and|z| = 1. In this paper we consider the operator B, which carries a polynomial p(z) into展开更多
文摘Let Pn be the class of polynomials of degree at most n. Rather and Shah [15] proved that if P∈Pn and P(z) 6=0 in|z|〈1, then for every R〉0 and 0≤q〈∞,|B[P(Rz)]|q≤|RnB[zn]+λ0|q|1+zn|q |P(z)|q, where B is a Bn-operator. In this paper, we prove some generalization of this result which in particular yield-s some known polynomial inequalities as special. We also consider an operator Dαwhich maps a polynomial P(z) into DαP(z):=nP(z)+(α-z)P′(z) and obtain exten-sions and generalizations of a number of well-known Lq inequalities.
文摘Let be the class of polynomials of degree n and a family of operators that map into itself. For , we investigate the dependence of on the maximum modulus of on for arbitrary real or complex numbers , with , and , and present certain sharp operator preserving inequalities between polynomials.
文摘For a polynomial p(z) 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), 38-41) establishedfor any complex number β with |β|≤ and|z| = 1. In this paper we consider the operator B, which carries a polynomial p(z) into
