Lattice isomorphic Banach lattices of polynomials
Abstract
We study D\'iaz-Dineen's problem for regular homogeneous vector-valued polynomials. In particular, we prove that if E* and F* are lattice isomorphic with at least one having order continuous norm, then Pr(n E; G*) and Pr(n F; G*) are lattice isomorphic for every n∈ and every Banach lattice G. We also study the analogous problem for the classes of regular compact, regular weakly compact, orthogonally additive and regular nuclear polynomials.
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