Deniz, Emre2025-01-212025-01-2120161303-5991https://doi.org/10.1501/Commual_0000000764https://search.trdizin.gov.tr/tr/yayin/detay209737https://hdl.handle.net/20.500.12587/23926By using given arbitrary sequences, beta(n) > 0, n is an element of N with the property that lim(n ->infinity)n beta(n) 0 lim(n ->infinity)n beta(n) = 0, we give a Kantorovich type generalization of Jain operator based on the a Poisson disrtibition. Fristly we give the quantitative Voronovskaya type theorem. Then we also obtain the Griiss Voronovskaya type theorem in quantitative form.We show that they have an arbitrary good order of weighted approximation.eninfo:eu-repo/semantics/closedAccessJain operators; Kantorovich operators; Voronovskaya type theorem; Griiss-Voronovskaya type theorem; Weighted approximationArticle65212113210.1501/Commual_0000000764209737WOS:000407341300011N/A