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- G Das
  
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- Volume 105 Issue 3 August 1995 pp 315-327
  
  Degree of approximation of functions in the Hölder metric by (e, c) means
  
  G Das Tulika Ghosh B K Ray
  
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  Degree of approximation of functions by the (e, c) means of its Fourier series in the Hölder metric is studied.
- Volume 106 Issue 2 May 1996 pp 139-153
  
  Degree of approximation of functions by their fourier series in the generalized Hölder metric
  
  G Das Tulika Ghosh B K Ray
  
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  The paper studies the degree of approximation of functions by matrix means of their Fourier series in the generalized Hölder metric, generalizing many known results in the literature
- Volume 107 Issue 2 May 1997 pp 169-182
  
  Degree of approximation of functions in the Hölder metric by Borel’s means
  
  G Das A K Ojha B K Ray
  
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  After establishing the Fourier character of the series the authors have studied the degree of approximation of functions associated with the same series in the Hölder metric using Borel’s mean.
- Volume 107 Issue 4 November 1997 pp 391-403
  
  Abelian and Tauberian theorems for a new trigonometric method of summation
  
  G Das B K Ray
  
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  We first introduce a new trigonometric method of summation and then prove some Abelian and Tauberian theorems for this method.
- Volume 108 Issue 2 June 1998 pp 109-120
  
  Degree of approximation of functions associated with Hardy-Littlewood series in the generalized Hölder metric
  
  G Das A K Ojha B K Ray
  
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  The paper studies the degree of approximation of functions associated with Hardy Littlewood series in the generalized Hölder metric.
- Volume 112 Issue 2 May 2002 pp 299-319
  
  A new trigonometric method of summation and its application to the degree of approximation
  
  G Das Anasuya Nath B K Ray
  
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  The object of the present investigation is to introduce a new trigonometric method of summation which is both regular and Fourier effective and determine its status with reference to other methods of summation (see §2-§4) and also give an application of this method to determine the degree of approximation in a new Banach space of functions conceived as a generalized Holder metric (see §5).

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