Karslı, HarunGupta, Vijay2021-06-232021-06-2320080008-06241126-5434https://doi.org/10.1007/s10092-008-0145-4https://hdl.handle.net/20.500.12491/6341The aim of this paper is to study the behavior of the operators T(lambda) defined by T(lambda)(f;x) = (a)integral(b)K(lambda)(t-x,f(t))dt, x epsilon < a,b >. Here we estimate the rate of convergence at a point x, which has a discontinuity of the first kind as lambda -> lambda(0). This study is an extension of the papers [9] and [13], which includes Bernstein operators, Beta operators, Picard operators, Philips operators, Durrmeyer operators, etc. as special cases.eninfo:eu-repo/semantics/closedAccessRate of ConvergenceNonlinear Integral OperatorLocally Compact Abelian GroupHaar IntegralBounded VariationArticle10.1007/s10092-008-0145-445287982-s2.0-54949096169Q1WOS:000257218300002Q2