Hölder continuous functions and their Abel and logarithmic means (Q2724903)

Let \(H_{\alpha}\) be the Banach space of all \(2\pi\) periodic functions \(f\) with finite norm NEWLINE\[NEWLINE\|f\|_{\alpha}=\sup_{-\pi\leq x\leq\pi}|f(x)|+\sup_{x,y,x\neq y}\frac{|f(x)-f(y)|}{|x-y|^{\alpha}},\;0<\alpha\leq 1.NEWLINE\]NEWLINE The authors prove the following estimates for \(f\in H_{\alpha}:\) NEWLINE\[NEWLINE\|A_{{\lambda}_r}(f)-f\|_{\beta}=O\bigl((1-r)^{\alpha-\beta}\bigr),NEWLINE\]NEWLINE NEWLINE\[NEWLINE\|L^r(f)-f\|_p=O\bigl[\log (1-r)^{(\beta/\alpha)-1}(1-r)^{\alpha-\beta}r^{\beta}\bigr],NEWLINE\]NEWLINE where \(0\leq \beta<\alpha,\) NEWLINE\[NEWLINEA_{{\lambda}_r}(f)=(1-r)^{\lambda}+1\sum_{n=0}^{\infty}\binom{n+\lambda}n r^nS_n,NEWLINE\]NEWLINE NEWLINE\[NEWLINEL^r(f)=\frac{1}{|\log(1-r)|}\sum_{n=1}^{\infty}S_n\frac{r^n}{n},NEWLINE\]NEWLINE and \(S_n\) is the \(n\)-th partial sum of the Fourier series for \(f.\)