Operator algebras lie at the heart of functional analysis, providing a framework for studying rings of bounded operators on Hilbert and Banach spaces. Key examples include C*-algebras—norm-closed ...

Banach space theory and operator algebras form two pillars of modern functional analysis, linked by the study of bounded linear operators on complete normed spaces. Banach spaces provide a flexible ...

An operator algebra is an algebra of continuous linear operators on a Hilbert space. Such algebras can be associated to a variety of problems in mathematics and mathematical physics. The study of ...