Linear dynamics in reproducing kernel Hilbert spaces

Abstract

Complementing earlier results on dynamics of unilateral weighted shifts, we obtain a sufficient (but not necessary, with supporting examples) condition for hypercyclicity, mixing and chaos for Mz*, the adjoint of Mz, on vector-valued analytic reproducing kernel Hilbert spaces H in terms of the derivatives of kernel functions on the open unit disc D in C. Here Mz denotes the multiplication operator by the coordinate function z, that is \[ (Mz f) (w) = w f(w), \] for all f ∈ H and w ∈ D. We analyze the special case of quasi-scalar reproducing kernel Hilbert spaces. We also present a complete characterization of hypercyclicity of Mz* on tridiagonal reproducing kernel Hilbert spaces and some special classes of vector-valued analytic reproducing kernel Hilbert spaces.