Asymptotic sharpness of a Nikolskii type inequality for rational functions in the Wiener algebra
Abstract
We establish the asymptotic sharpness of a Nikolskii type inequality proved by A. Baranov and R. Zarouf for rational functions f in the Wiener algebra of absolutely convergent Fourier series, with at most n poles, all lying outside the dilated disc 1λD, where D denotes the open unit disc and λ∈[0,1) is fixed. More precisely, this inequality tells that the Wiener norm of such functions is bounded by their H2-norm -- i.e., their norm in the Hardy space of the disc -- times a factor of order n1-λ. In this paper, we construct explicit test functions showing that this bound cannot be improved in general: the inequality is asymptotically sharp as n∞, up to a universal constant, for every fixed λ∈[0,1).
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