Strict singularity of weighted composition operators on derivative Hardy spaces
Abstract
We prove that the weighted composition operator Wφ, fixes an isomorphic copy of p if the operator Wφ, is not compact on the derivative Hardy space Sp. In particular, this implies that the strict singularity of the operator Wφ, coincides with the compactness of it on Sp. Moreover, when p≠2, we characterize the conditions for those weighted composition operators Wφ, on Sp which fix an isomorphic copy of 2 .
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