Drazin inverse and generalization of core-nilpotent decomposition

Abstract: The Drazin inverse is connected with the notion of index and core-nilpotent decomposition whenever it is discussed in the context of ring of matrices over complex field. In the absence of Drazin inverse for a given element from an arbitrary associative ring (not necessarily with unity), in this paper, the notion of right (left) core-nilpotent decomposition has been introduced and established its relations with right (left) [Formula: see text]-regular property. In fact, the class of such decomposition has been … Show more