Mean Rational Approximation for Some Compact Planar Subsets

Abstract

In 1991, J. Thomson obtained celebrated structural results for Pt(μ). Later, J. Brennan (2008) generalized Thomson's theorem to Rt(K,μ) when the diameters of the components of C K are bounded below. The results indicate that if Rt(K,μ) is pure, then Rt(K,μ) L∞ (μ) is the "same as" the algebra of bounded analytic functions on abpe(Rt(K, μ)), the set of analytic bounded point evaluations. We show that if the diameters of the components of C K are allowed to tend to zero, then even though int(K) = abpe(Rt(K, μ)) and K = int(K), the algebra Rt(K,μ) L∞ (μ) may "be equal to" a proper sub-algebra of bounded analytic functions on int(K), where functions in the sub-algebra are "continuous" on certain portions of the inner boundary of K.

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