We compute the degree of approximation of functions f^~ in Hw a new Banach space using $(T.E^1)$ summability means of conjugate series of Fourier series. In this paper, we extend the results of Singh and Mahajan [T. Singh and P. Mahajan, Error bound of periodic signals in the H"{o}lder metric, Int. J. Math. Math. Sci. Volume 2008 (2008), Article ID 495075, 9 pages] which in turn generalizes the result of Lal and Yadav [S. Lal and K. N. S. Yadav, On degree of approximation of function belonging to the Lipschitz class by $(C,1)(E,1)$ means of its Fourier series, Bull. Cal. Math. Soc. Vol. 93 (2001) 191 -196]. Some corollaries have also been deduced from our main theorem and particular cases.
Khatri, K. and Mishra, V. Narayan (2015). Degree of Approximation by the $(T.E^1)$ Means of Conjugate Series of Fourier Series in the Hölder Metric. Iranian Journal of Science, (), -. doi: 10.22099/ijsts.2015.3225
MLA
Khatri, K. , and Mishra, V. Narayan. "Degree of Approximation by the $(T.E^1)$ Means of Conjugate Series of Fourier Series in the Hölder Metric", Iranian Journal of Science, , , 2015, -. doi: 10.22099/ijsts.2015.3225
HARVARD
Khatri, K., Mishra, V. Narayan (2015). 'Degree of Approximation by the $(T.E^1)$ Means of Conjugate Series of Fourier Series in the Hölder Metric', Iranian Journal of Science, (), pp. -. doi: 10.22099/ijsts.2015.3225
CHICAGO
K. Khatri and V. Narayan Mishra, "Degree of Approximation by the $(T.E^1)$ Means of Conjugate Series of Fourier Series in the Hölder Metric," Iranian Journal of Science, (2015): -, doi: 10.22099/ijsts.2015.3225
VANCOUVER
Khatri, K., Mishra, V. Narayan Degree of Approximation by the $(T.E^1)$ Means of Conjugate Series of Fourier Series in the Hölder Metric. Iranian Journal of Science, 2015; (): -. doi: 10.22099/ijsts.2015.3225
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