A uniform approach to complete interpolating sequences for small Fock spaces with p > 0

Abstract

We study complete interpolating sequences in two types of small Fock spaces, Fpα + and Fpα, for 0 < p ∞. One-sided small Fock spaces Fpα + are well-studied spaces of entire functions with sub-exponential growth, while Fpα are their two-sided analogue with a symmetric singularity at the origin. For one-sided small Fock spaces Fpα +, we provide a streamlined, perturbation-type description of complete interpolating sequences that unifies and extends earlier results for 1 p ∞ to the full range 0 < p ∞. For two-sided small Fock spaces Fpα, we establish a parallel characterization, revealing a curious periodicity phenomenon: complete interpolating sequences for Fpα coincide exactly for p = 1, p = 2, and p = ∞, but differ for other p 1.

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