Reducing subspaces for analytic multipliers of the Bergman space

Abstract: We answer affirmatively the problem left open in \cite{DSZ,GSZZ} and prove that for a finite Blaschke product $\phi$, the minimal reducing subspaces of the Bergman space multiplier $M_\phi$ are pairwise orthogonal and their number is equal to the number $q$ of connected components of the Riemann surface of $\phi^{-1}\circ \phi$. In particular, the double commutant ${M_\phi,M_\phi^\ast}'$ is abelian of dimension $q$. An analytic/arithmetic description of the minimal reducing subspaces of $M_\phi$ is also provided, along with a list of all possible cases in degree of $\phi$ equal to eight.