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The weighted Turán type inequality for generalised Jacobi weights

Published online by Cambridge University Press:  17 April 2009

J. L. Wang  and
S. P. Zhou
J. L. Wang
Affiliation:
The Mathematical Institute, Ningbo University, Ningbo, Zhejiang 315211, China and Department of Mathematics, Shaoxing Arts and Science College, Shaoxing, Zhejiang 312000, China e-mail: jiaswu@zscas.edu.ch
S. P. Zhou
Affiliation:
The Mathematical Institute, Ningbo University, Ningbo, Zhejiang 315211, China.
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We study the weighted Turán type inequality for generalised Jacobi weights, and give a complete positive answer to Zhou's conjecture.

Type
Research Article
Information
Bulletin of the Australian Mathematical Society , Volume 66 , Issue 2 , October 2002 , pp. 259 - 265
Copyright
Copyright © Australian Mathematical Society 2002

References

[1]Bakenko, V.F. and Pichugov, S.A., ‘Accurate inequality for the derivative of trigonometric polynomials which have real zeros’, (in Russian), Mat. Zametki 39 (1986), 330336.Google Scholar
[2]Bakenko, V.F. and Pichugov, S.A., ‘Inequality for the derivative of polynomials with real zeros’, (in Russian), Ukrain. Math. Zh. 38 (1986), 411416.Google Scholar
[3]Eröd, J., ‘Bizonyos polinomok maximumairól’, Math. Fiz. Lopok 46 (1939), 5882.Google Scholar
[4]Milovanović, G.V. and Rassias, T.M., ‘New developments on Turán's external problems for polynomials’, in Approximation Theory: In Memory of A. K. Varma (Marcel Dekker, Inc., New York, 1998), pp. 433447.Google Scholar
[5]Turán, P., ‘Uber dir ableitung von polynomen’, Compositio Math. 7 (1939), 8995.Google Scholar
[6]Varma, A.K., ‘An analogue of some inequality of P. Turán concerning algebraic polynomials satisfying certain conditions’, Proc. Amer. Math. Soc 55 (1976), 305309.Google Scholar
[7]Varma, A.K., ‘An analogue of some inequlity of P. Turán concerning algebraic polynomials having all zeros inside [−1, 1]’, Proc. Amer. Math. Soc 69 (1978), 2533.Google Scholar
[8]Varma, A.K., ‘Some inequalities of algebraic polynomials having all zeros inside [−1, 1]’, Proc. Amer. Math. Soc. 88 (1983), 227233.Google Scholar
[9]Xiao, W. and Zhou, S.P., ‘On weighted Turán type inequality’, Glas. Mat. Ser. III 34(54) (1999), 197202.Google Scholar
[10]Zhou, S.P., ‘Some remark on Turán type inequality’, J. Approx. Theory 68 (1992), 4548.CrossRefGoogle Scholar
[11]Zhou, S.P., ‘Some remark on Turán type inequality. II’, J. Math. Anal. Appl. 180 (1993), 138143.Google Scholar
[12]Zhou, S.P., ‘Some remark on Turán type inequality. III: the completion’, Anal. Math. 21 (1995), 313318.Google Scholar