JCA-03-04 |
» Exact evaluation of some highly oscillatory integrals
(07/2013) |

MIA-17-52 |
» An application of Jensen's inequality in determining the order of magnitude of multiple Fourier coefficients of functions of bounded *φ*-variation
(04/2014) |

MIA-17-85 |
» Determination of order of magnitude of multiple Fourier coefficients of functions of bounded *ϕ*-variation having lacunary Fourier series using Jensen's inequality
(07/2014) |

MIA-17-86 |
» On multiple Fourier coefficients of functions of *ϕ*-*Λ*-bounded variation
(07/2014) |

JCA-05-08 |
» Trigonometric approximation of periodic Signals belonging to generalized weighted Lipschitz *W*^{'}(L_{r},ξ(t)),(r≥1) - class by Nörlund-Euler *(N,p*_{n}) (E,q) operator of conjugate series of its Fourier series
(10/2014) |

JCA-06-11 |
» Approximation of functions of Lipschitz class by *(N,p*_{n})(E,1) summability means of conjugate series of Fourier series
(04/2015) |

MIA-21-68 |
» Basis properties of *p*-exponential function of Lindqvist and Peetre type
(10/2018) |

JMI-13-33 |
» Sharp bounds on the sinc function via the Fourier series method
(06/2019) |

MIA-22-75 |
» Fourier series method related to Wilker-Cusa-Huygens inequalities
(10/2019) |

JMI-14-18 |
» On approximation of function in generalized Zygmund class using *C*^{η}T operator
(03/2020) |

JCA-18-01 |
» On weighted β-absolute convergence of double Fourier series
(07/2021) |

MIA-26-01 |
» Hardy-Littlewood-Stein inequalities for double trigonometric series
(01/2023) |

JCA-21-01 |
» Functions of (ϕ,ψ)-bounded variation and its double Walsh-Fourier coefficients
(01/2023) |