Boundary Smoothness conditions for functions in Rp(X)
Abstract
Let X be a compact subset of the complex plane and let Rp(X), 2< p < ∞, denote the closure of the rational functions with poles off X in the Lp norm. In this paper we consider three conditions that show how the functions in Rp(X) can have a greater degree of smoothness at the boundary of X than might otherwise be expected. We will show that two of the conditions are equivalent and imply the third but the third does not imply the other two.
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