Extension domains for Hardy spaces
Abstract
We show that a proper open subset ⊂ Rn is an extension domain for Hp (0<p1), if and only if it satisfies a certain geometric condition. When n(1p-1)∈ N this condition is equivalent to the global Markov condition for c, for p=1 it is stronger, and when n(1p-1) N \0\ every proper open subset is an extension domain for Hp. It is shown that in each case a linear extension operator exists. We apply our results to study some complemented subspaces of BMO(Rn).
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