M-ideals: from Banach spaces to rings

Abstract

We introduce and investigate a class of ring ideals, termed ring M-ideals, inspired by the Alfsen--Effros theory of M-ideals in Banach spaces. We show that M-ideals extend the classical notion of essential ideals and subsume them as a subclass. The central theorem provides a full characterization: an ideal is an M-ideal if and only if it is either essential or relatively irreducible. This dichotomy reveals the abundant and diverse nature of M-ideals, encompassing both essential and minimal ideals, and admits natural generalizations in rings beyond the commutative and unital settings. We systematically study the algebraic stability of M-ideals under standard constructions such as intersection, quotient, direct product, and Morita equivalence and establish their behavior in topological rings and operator algebras. In certain rings such as Zn and C*-algebras, we completely classify M-ideals and relate them to algebraically minimal projections and central idempotents. The ring M-ideals in C(K) are shown to be precisely the essential ideals or those minimal ideals corresponding to isolated points. Structurally, we show that the absence of proper M-ideals characterizes simplicity, while rings in which every proper M-ideal is a direct summand must decompose as finite direct sums of simple rings. In closing, we introduce the notion of M-complements, drawing an analogy with essential extensions in module theory, and demonstrate their existence.

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