Aral, AliAcar, TuncerKursun, Sadettin2025-01-212025-01-2120221664-23681664-235Xhttps://doi.org/10.1007/s13324-022-00667-9https://hdl.handle.net/20.500.12587/24864In this paper, we introduce a new family of operators by generalizing Kantorovich type of exponential sampling series by replacing integral means over exponentially spaced intervals with its more general analogue, Mellin Gauss Weierstrass singular integrals. Pointwise convergence of the family of operators is presented and a quantitative form of the convergence using a logarithmic modulus of continuity is given. Moreover, considering locally regular functions, an asymptotic formula in the sense of Voronovskaja is obtained. By introducing a new modulus of continuity for functions belonging to logarithmic weighted space of functions, a rate of convergence is obtained. Some examples of kernels satisfying the obtained results are presented.eninfo:eu-repo/semantics/closedAccessExponential sampling series; Kantorovich operators; Gauss-Weierstrass kernel; Mellin differential operator; Pointwise convergence; Asymptotic formulaArticle12210.1007/s13324-022-00667-92-s2.0-85126260173Q1WOS:000767791000003Q1