On approximation of integrable functions by Riemann means of partial sums of Fourier series (Q1921492)

The author considers the cubic partial sums \(S_N(x)\) of the \(m\)-multiple Fourier series of a function \(f\in L^1(\mathbb{T}^m)\). Given \(p=1,2,\dots\) and \(h>0\), by means of the kernel \[ R_p(h,x):={1\over \pi} \Biggl({1\over 2}+ \sum^\infty_{q=1} \Biggl({\sin qh\over qh}\Biggr)^p\cos qx\Biggr), \] he defines the Riemann integral mean of order \(p\) either of \(f\) or of \(S_N\), denoted by \(\Phi^{(p)}_k(\overline x)\) and \(\Psi^{(p)}_{k,N}(\overline x)\), respectively, where \(\overline x:=(x_1,\dots, x_m)\). The aim of the present paper is to estimate \(|\Phi^{(p)}_k(\overline x)- \Psi^{(p)}_{k,N}(\overline x)|\) from above for various values of \(N= N(k)\). In the particular case \(m=2\) and \(p=1\), some probabilistic estimates are established for \(|\Phi^{(1)}_k(\overline x)- \Psi^{(1)}_{k,k^2}(\overline x)|_2\), where \(|\cdot|_2\) is the norm of \(L_2(\mathbb{T}^2)\).