The Inhomogeneous Hall's Ray
classification
🧮 math.NT
keywords
spectrumalphaepsilonhallalwaysapproximationassociatedcase
read the original abstract
We show that the inhomogenous approximation spectrum, associated to an irrational number \alpha\ always has a Hall's Ray; that is, there is an \epsilon>0 such that [0,\epsilon) is a subset of the spectrum. In the case when \alpha\ has unbounded partial quotients we show that the spectrum is just a ray.
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