We consider a class of summability methods for the classical cardinal sine series that are related to the Bernstein-Boas representation of entire functions of exponential type less than π. We provide conditions that ensure regularity of the methods, prove a Tauberian type theorem, and give an example of a function in the Bernstein class Bπ whose samples do not give rise to a convergent cardinal sine series and are not summable via the methods that are considered here.
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