Linear recurrences and rational Lambert series
Abstract
For a sequence γ=(γn)n 1, define \[ Lγ(z):=Σn 1γnzn1-zn =Σn 1(Σd nγd)zn. \] We prove a short rigidity theorem: if γ is eventually linearly recurrent and Lγ(z) is rational, then γ is finitely supported. Equivalently, among sequences with rational ordinary generating function, the only ones whose Lambert series is rational are the finitely supported sequences. The proof specializes the data at a finite place of a finitely generated ring and then uses the periodicity of recurrences over finite fields.
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