Cyclicity preserving operators on spaces of analytic functions in Cn

Abstract

For spaces of analytic functions defined on an open set in Cn that satisfy certain nice properties, we show that operators that preserve shift-cyclic functions are necessarily weighted composition operators. Examples of spaces for which this result holds true consist of the Hardy space Hp(Dn) \, (0 < p < ∞), the Drury-Arveson space H2n, and the Dirichlet-type space Dα \, (α ∈ R). We focus on the Hardy spaces and show that when 1 ≤ p < ∞, the converse is also true. The techniques used to prove the main result also enable us to prove a version of the Gleason-Kahane-\.Zelazko theorem for partially multiplicative linear functionals on spaces of analytic functions in more than one variable.