Applications of the Fuglede-Kadison determinant: Szeg\"o's theorem and outers for noncommutative Hp

Abstract

We first use properties of the Fuglede-Kadison determinant on Lp(M), for a finite von Neumann algebra M, to give several useful variants of the noncommutative Szeg\"o theorem for Lp(M), including the one usually attributed to Kolmogorov and Krein. As an application, we solve the longstanding open problem concerning the noncommutative generalization, to Arveson's noncommutative Hp spaces, of the famous `outer factorization' of functions f with |f| integrable. Using the Fuglede-Kadison determinant, we also generalize many other classical results concerning outer functions.

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