Ring isomorphisms of -subalgebras of Murray-von Neumann factors

Abstract

The present paper is devoted to study of ring isomorphisms of -subalgebras of Murray--von Neumann factors. Let , be von Neumann factors of type II1, and let S(), S() be the -algebras of all measurable operators affiliated with and , respectively. Suppose that ⊂ S(), ⊂ S() are their -subalgebras such that ⊂ , ⊂ . We prove that for every ring isomorphism : there exist a positive invertible element a ∈ with a-1∈ and a real -isomorphism : (which extends to a real -isomorphism from onto ) such that (x) = a(x)a-1 for all x ∈ . In particular, is real-linear and continuous in the measure topology. In particular, noncommutative Arens algebras and noncommutative log-algebras associated with von Neumann factors of type II1 satisfy the above conditions and the main Theorem implies the automatic continuity of their ring isomorphisms in the corresponding metrics. We also present an example of a -subalgebra in S(), which shows that the condition ⊂ is essential in the above mentioned result.