Odometer maps on Fock spaces: block decompositions, Toeplitz-type realizations, and the adjoint

Abstract

We study odometer maps WL on vector-valued full Fock spaces arising from Fock representations of the odometer semigroup. We obtain a canonical upper triangular block decomposition \[ WL= pmatrix W11 & W12\\ 0 & W22 pmatrix, \] where W11 is unitary and W22 admits a Hardy space realization as an analytic Toeplitz operator MΘ. The associated symbol Θ∈ H∞B(E)(D) is used to characterize the isometric, unitary, and invertible cases, as well as norm identities and Douglas-type factorization properties of WL. We also derive an explicit formula for WL* for arbitrary bounded symbols L. In the isometric case, this identifies WL* with EL LE, and hence mult(WL)=(EL LE)=mult(MΘ). In the same setting, the condition (EL LE)<∞ is equivalent both to Fredholmness and to essential normality of WL, with ind(WL)=-(EL LE). We further obtain Coburn-type spectral consequences and a necessary condition for hyponormality.