Degree of approximation of conjugate of a function belonging to Lip\((\xi(t),p)\) class by matrix summability means of conjugate Fourier series. (Q5957243)

The problem of approximation of the conjugate of a 2\(\pi \)-periodic function \(f\) belonging to the class Lip(\(\xi (t),p\)) by matrix means \(t_{n}(x,f)\) is studied. The function \(f\) belongs to the generalized Lipschitz class Lip(\(\xi (t),p\)) if \(\int\limits_{0}^{2\pi }| f(x+t)-f(x)| ^{p}dx\leq\text{const}[\xi (t)]^{p}.\) According to the Theorem 4.1 (the main result) \(| | \overline{t}_{n}(x,f)-\overline{f}(x)| | _{p}\leq\text{ const}\xi (1/n)n^{1/p},\) where the function \(\xi \) satisfies some conditions (4.2) and (4.3).NEWLINENEWLINE Unfortunatuly these conditions depend on \(f\). Moreover, the main result compared with estimate (7.7) is far from the best. The proof of some statements are not clear, for example the proofs of Corollary 7.1 is as strange as the statement of Corollary 7.2.