On the approximation by convolution type double singular integral operators

Abstract

In this paper, we prove the pointwise convergence and the rate of pointwise convergence for a family of singular integral operators in two-dimensional setting in the following form: equation* Lλ ( f;x,y) =D f( t,s) Kλ ( t-x,s-y) dsdt, ( x,y) ∈ D, equation* where D= a,b × c,d is an arbitrary closed, semi-closed or open rectangle in R2 and % λ ∈ , is a set of non-negative indices with accumulation point λ0. Also, we provide an example to support these theoretical results. In contrast to previous works, the kernel function Kλ ( t,s) does not have to be even, positive or 2π -periodic.