Open Access Open Access  Restricted Access Subscription Access
Open Access Open Access Open Access  Restricted Access Restricted Access Subscription Access

Approximation of Signals by Harmonic-Euler Triple Product Means


Affiliations
1 Department of Mathematics, National Institute of Technology, Kurukshetra - 136119, India
     

   Subscribe/Renew Journal


Our paper deals with the approximation of signals by H1.Eθ.Eθ product means of Fourier and its conjugate series. New theorems based on H1.Eθ.Eθ product summability have been established and proved under general conditions. The established theorems extend, generalize and improve various existing results on summability of Fourier series and its conjugate series.

Keywords

Degree of Approximation, Harmonic-Euler (H1.Eθ.Eθ) - Summability, Fourier Series, Conjugate Series, Lebesgue integral, Second Mean Value (SMV) Theorem
Subscription Login to verify subscription
User
Notifications
Font Size


  • P. Chandra, On the degree of approximation of a class of functions by means of Fourier series, Acta Math. Hungar., 52 (3-4)(1988), 199 - 205.
  • X. Z. Krasniqi, On the degree of approximation of a function by (C, 1)(E, q) means of its Fourier-Laguerre series, Int. J. Analysis Appl., 1 (1)(2013), 33 - 39.
  • X. Z. Krasniqi and Deepmala, On approximation of functions belonging to some classes of functions by (N, pn, qn)(Eθ ) means of conjugate series of its Fourier series, Khayyam J. Math., 6 (1)(2020), 73 - 86.
  • S. Lal and H. K. Nigam, On almost (N, p, q) summability of conjugate Fourier series, Int. J. Math. Mathematical Sc., 25 (6)(2001), 365 - 372.
  • S. Lal and J. K. Kushwaha, Degree of approximation of lipschitz function by product summability method, Int. Math. Forum, 4 (43)(2009), 2101 - 2107.
  • M. L. Mittal and G. Prasad, On a sequence of Fourier coefficients, Indian J. Pure Appl. Math, 23 (3)(1992), 235 - 241.
  • M. L. Mittal and U. Singh, T· C1 summability of a sequence of Fourier coefficients, Appl. Math. Comput., 204 (2)(2008), 702 - 706.
  • R. Mohanty and M. Nanda, On the behaviour of Fourier coefficients, Proc. Amer. Math. Soc., 1 (1954), 79 - 84.
  • M. Mursaleen and A. Alotaibi, Generalized matrix summability of a conjugate derived Fourier series, Jour. Ineq. Appl., (2017) 2017: 273.
  • K. Qureshi, On the degree of approximation to a function belonging to weighted W(L(r), (t)) Class, Indian J. Pure App. Math, 13 (4)(1982), 471 - 475.
  • B. N. Sahney and D. S. Goel, On the degree of approximation of continuous functions, Ranchi Univ. Math. J, 4. (1973), 50 - 53.
  • S. Sonker, Approximation of Functions by means of its Fourier-Laguerre series, Proceeding of ICMS-2014, 1. (1)(2014), 125 - 128.
  • S. Verma and K. Saxena, A study on (H, 1)(E, q) product summability of Fourier series and its Conjugate series, Math. Theory and Model., 7. (5) (2017).
  • A. Zygmund, Trigonometric series, Cambridge University Press, 2002.

Abstract Views: 265

PDF Views: 0




  • Approximation of Signals by Harmonic-Euler Triple Product Means

Abstract Views: 265  |  PDF Views: 0

Authors

Smita Sonker
Department of Mathematics, National Institute of Technology, Kurukshetra - 136119, India
Paramjeet Sangwan
Department of Mathematics, National Institute of Technology, Kurukshetra - 136119, India

Abstract


Our paper deals with the approximation of signals by H1.Eθ.Eθ product means of Fourier and its conjugate series. New theorems based on H1.Eθ.Eθ product summability have been established and proved under general conditions. The established theorems extend, generalize and improve various existing results on summability of Fourier series and its conjugate series.

Keywords


Degree of Approximation, Harmonic-Euler (H1.Eθ.Eθ) - Summability, Fourier Series, Conjugate Series, Lebesgue integral, Second Mean Value (SMV) Theorem

References





DOI: https://doi.org/10.18311/jims%2F2021%2F26084