Interpolation problems in subdiagonal algebras

Abstract: Let $\mathfrak A$ be a subdiagonal algebra with diagonal $\mathfrak D$ in a $σ$-finite von Neumann algebra $\mathcal M$ with respect to a faithful normal conditional expectation $Φ$. We mainly consider the interpolation problem in $\mathfrak A$ with the universal factorization property. We determine when a finitely generated left ideal in $\mathfrak A$ is trivial. By constructing a periodic flow on $\mathcal M$ according to a type 1 subdiagonal algebra, we show that type 1 subdiagonal algebras coincide with analytic operator algebras associated with periodic flows in von Neumann algebras. This enables us to present a form decomposition of a type 1 subdiagonal algebra. As an application, we deduce a noncommutative operator-theoretic variant of the Corona theorem for type 1 subdiagonal algebras.