On the Rate of Convergence of Cesàro Means of Walsh-Fourier Series

This paper deals with the CesaÁ ro means of conjugate Jacobi series introduced by Muckenhoupt and Stein and Li. The exact estimates of the norms of the conjugate (C, $) kernel for 0 $ :+ 1 2 are obtained. It is proved that when $>:+ 1 2 , the (C, $) means of the conjugate Jacobi expansion of a funct

## Abstract We define the effective integrability of Fine‐computable functions and effectivize some fundamental limit theorems in the theory of Lebesgue integrals such as the Bounded Convergence Theorem, the Dominated Convergence Theorem, and the Second Mean Value Theorem. It is also proved that th

The two-dimensional classical Hardy spaces H p (T\\_T) on the bidisc are introduced and it is shown that the maximal operator of the CesaÁ ro means of a distribution is bounded from H p (T\\_T) to L p (T 2 ) ( 3Â4 (T\\_T), L 1 (T 2 )) where the Hardy space H 1 > (T\\_T) is defined by the hybrid maxi

The d-dimensional classical Hardy spaces H T are introduced and it is shown p that the maximal operator of the Cesaro means of a distribution is bounded from Ž that the supremum in the maximal operator is taken over a positive cone. As a consequence we obtain the summability result due to Marcinkie