Yilmaz, Mine MenekseUysal, Gumrah2024-09-292024-09-2920171307-5543https://hdl.handle.net/20.500.14619/8528In this paper, the pointwise approximation to functions f epsilon L-1,(w) (a, b) by the convolution type singular integral operators given in the following form: L-lambda(f; x) = integral(b)(a) f(t) K(lambda()t-x)dt, x epsilon(a,b), lambda epsilon A subset of R-0(+) where (a,b) stands for arbitrary closed, semi closed or open bounded interval in R or R itself L-1,(w)(a,b) denotes the space of all measurable but non-integrable functions f for which vertical bar f/w vertical bar integrable on (a,b) and w : R R+ is a corresponding weight function, at mu-generalized Lebesgue point and the rate of convergenceat this point are studied.eninfo:eu-repo/semantics/closedAccessGeneralized Lebesgue pointWeighted pointwise convergenceRate of convergenceConvergence of Singular Integral Operators in Weighted Lebesgue SpacesArticle347233510WOS:000398542300012N/A