Jordan Blocks of H2(Dn)

Abstract

We develop a several variables analog of the Jordan blocks of the Hardy space H2(D). In this consideration, we obtain a complete characterization of the doubly commuting quotient modules of the Hardy module H2(Dn). We prove that a quotient module of H2(Dn) (n ≥ 2) is doubly commuting if and only if \[ = _1 ·s _n,\]where each _i is either a one variable Jordan block H2(D)/i H2(D) for some inner function i or the Hardy module H2(D) on the unit disk for all i = 1, …, n. We say that a submodule of H2(Dn) is a co-doubly commuting if the quotient module H2(Dn)/ is doubly commuting. We obtain a Beurling like theorem for the class of co-doubly commuting submodules of H2(Dn). We prove that a submodule of H2(Dn) is co-doubly commuting if and only if \[ = Σi=1m i H2(Dn),\]for some integer m ≤ n and one variable inner functions \i\i=1m.