Kahrıman, Gizem2025-02-092025-02-0920242687-653110.54286/ikjm.1433913https://hdl.handle.net/11501/1850https://doi.org/10.54286/ikjm.1433913https://dergipark.org.tr/en/pub/ikjm/issue/82612/1433913Group action is determined bythe automorphism group and algebra action is defined by the multiplication algebra. In the study we generalize the multiplication algebra by defining multipliers of an R-algebroid M. Firstly, the set of bimultipliers on an R-algebroid is introduced, it is denoted by Bim(M), then it is proved that this set is an R-algebroid, it is called multiplication R-algebroid. Using this Bim(M), for an R-algebroid morphism A ? Bim(M) it is shown that this morphism gives an R-algebroid action. Then we examine some of the properties associated with this action.eninfo:eu-repo/semantics/openAccessR-AlgebroidBimultiplierArticle401306