Abstract
The strong $$N^p(X), \mathcal {N}^p(X)$$ and weak $$wN^p(X), w\mathcal {N}^p(X)$$ spaces of analytic functions with values in a Banach space X, modeled on the large Hardy $$N^p$$ and Bergman $$\mathcal {N}^p$$ algebras respectively, are studied. The Frechet envelopes and the continuous linear functionals on these spaces are described. We show that, although that strong and weak spaces are different, they have the same locally convex structure (the Frechet envelopes are equal).
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