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Multiple Fourier Sums on Sets of \(\bar \psi\)-Differentiable Functions (Low Smoothness)

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Abstract

We investigate the behavior of deviations of rectangular partial Fourier sums on sets of \(\bar \psi\)-differentiable functions of many variables.

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REFERENCES

  1. A. I. Stepanets, “Approximation of \(\bar \psi\)-integrals of periodic functions by Fourier sums (low smoothness). I, II,” Ukr. Mat. Zh., 50, No. 2, 274–291 (1998), No. 3, 388–400 (1998).

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  2. A. I. Stepanets and N. L. Pachulia, “Multiple Fourier sums on sets of (ψ,β)-differentiable functions,” in: Multiple Fourier Sums on Sets of (ψ,β)-Differentiable Functions [in Russian], Preprint No. 55, Institute of Mathematics, Ukrainian Academy of Sciences, Kiev (1990), pp. 1–16.

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  3. A. I. Stepanets and N. L. Pachulia, “Multiple Fourier sums on sets of (ψ,β)-differentiable functions,” Ukr. Mat. Zh., 43, No. 4, 545–555 (1991).

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Authors
  1. R. A. Lasuriya
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Lasuriya, R.A. Multiple Fourier Sums on Sets of \(\bar \psi\)-Differentiable Functions (Low Smoothness). Ukrainian Mathematical Journal 55, 1099–1109 (2003). https://doi.org/10.1023/B:UKMA.0000010608.22181.d0

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  • DOI: https://doi.org/10.1023/B:UKMA.0000010608.22181.d0

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