Keskin, ANoiri, TYuksel, S2020-03-262020-03-2620040236-5294https://dx.doi.org/10.1023/B:AMHU.0000036290.48695.3ehttps://hdl.handle.net/20.500.12395/19069First, we introduce the notion of f(I)-sets and investigate their properties in ideal topological spaces. Then, we also introduce the notions of R-I C-continuous, f(I)-continuous and contra*-continuous functions and we show that a function f : (X,tau,I) --> (Y, phi) is RIC-continuous if and only if it is f(I)-continuous and contra*-continuous.en10.1023/B:AMHU.0000036290.48695.3einfo:eu-repo/semantics/openAccessdecomposition of RIC-continuitytopological idealf(I)-setregular-I-closedArticle1044307313Q2WOS:000223836400004Q4