Almost-everywhere convergence of Fourier series for functions in Sobolev spaces
Abstract
Let Sλ F(x) be the spherical partial sums of the multiple Fourier series of function F∈ L2(TN). We prove almost-everywhere convergence Sλ F(x)→ F(x) for functions in Sobolev spaces Hpa(TN) provided 1< p ≤ 2 and a> (N-1)(1p-12). For multiple Fourier integrals this is well known result of Carbery and Soria (1988). To prove our result, we first extend the transplantation technic of Kenig and Tomas (1980) from Lp spaces to Hpa spaces, then apply it to the Carbery and Soria result.
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