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Power-Monotone Sequences and Fourier Series with Positive Coefficients  
 
  Authors: Jozsef Nemeth,  
  Keywords: Fourier series, Fourier coefficients, modulus of continuity, quasi power-monotone sequences  
  Date Received: 25/07/00  
  Date Accepted: 10/08/00  
  Subject Codes:

26A16,26A15,40A05

 
  Editors: Laszlo Leindler,  
 
  Abstract:

M. and S. Izumi [2] and the present author [7] have extended certain theorems of R.P. Boas [1] concerning the Fourier coefficients of functions belonging to the Lipschitz classes. Very recently L. Leindler [6] has given further generalization using the so called quasi power-monotone sequences. The goal of the present work is to further prove theorems similar to those of L. Leindler.

[1] R.P. BOAS Jr., Fourier series with positive coefficients, J. Math. Anal. Appl., 17 (1967), 463–483.
[2] M. IZUMI
and S. IZUMI, Lipschitz classes and Fourier coefficients, J. Math. Mech., 18 (1969), 857–870.
[6] L. LEINDLER, Power-monotone sequences and Fourier series with positive coefficients, J. Inequal.
Pure Appl. Math., 1(1) (2000), Article 1, http://jipam.vu.edu.au/v1n1/001_99.html
[7] J. NEMETH, Fourier series with positive coefficients and generalized Lipschitz classes, Math. 54 (1990), 291–304.;



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