• Title of article

    Extension of a Theorem of Ferenc Luk´acs from Single to Double Conjugate Series1

  • Author/Authors

    Ferenc M´oricz، نويسنده ,

  • Issue Information
    دوهفته نامه با شماره پیاپی سال 2001
  • Pages
    14
  • From page
    582
  • To page
    595
  • Abstract
    A theorem of Ferenc Luk´acs states that if a periodic function f is integrable in the Lebesgue sense and has a discontinuity of the first kind at some point x, then the mth partial sum of the conjugate series of its Fourier series diverges at x at the rate of log m. The aim of the present paper is to extend this theorem to the rectangular partial sum of the conjugate series of a double Fourier series when conjugation is taken with respect to both variables. We also consider functions of two variables which are of bounded variation over a rectangle in the sense of Hardy and Krause. As a corollary, we obtain that the terms of the Fourier series of a periodic function f of bounded variation over the square , , determine the atoms of the finite Borel measure induced by f.
  • Keywords
    rate ofdivergence , sector limits of a function in two variables , rectangular partial sum , function of bounded variation over a rectangle in the sense of Hardyand Krause , criterion of nonatomic measure. , induced Borel measure , Fourier series , conjugate series
  • Journal title
    Journal of Mathematical Analysis and Applications
  • Serial Year
    2001
  • Journal title
    Journal of Mathematical Analysis and Applications
  • Record number

    933186