Principles of operator algebras

Abstract

This is an introduction to the algebras A⊂ B(H) that the linear operators T:H H can form, once a complex Hilbert space H is given. Motivated by quantum mechanics, we are mainly interested in the von Neumann algebras, which are stable under taking adjoints, T T*, and are weakly closed. When the algebra has a trace tr:A C, we can think of it as being of the form A=L∞(X), with X being a quantum measured space. Of particular interest is the free case, where the center of the algebra reduces to the scalars, Z(A)= C. Following von Neumann, Connes, Jones, Voiculescu and others, we discuss the basic properties of such algebras A, and how to do algebra, geometry, analysis and probability on the underlying quantum spaces X.