Strict singularity of a Volterra-type integral operator on Hp
Abstract
We prove that a Volterra-type integral operator Tgf(z) = ∫0z f(ζ)g'(ζ)dζ, \, z ∈ D, defined on Hardy spaces Hp, \, 1 p < ∞, fixes an isomorphic copy of p, if the operator Tg is not compact. In particular, this shows that the strict singularity of the operator Tg coincides with the compactness of the operator Tg on spaces Hp. As a consequence, we obtain a new proof for the equivalence of the compactness and the weak compactness of the operator Tg on H1.
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