Unconditional basic sequences in function spaces with applications to Orlicz spaces

Abstract

We find conditions on a function space L that ensure that it behaves as an Lp-space in the sense that any unconditional basis of a complemented subspace of L either is equivalent to the unit vector system of 2 or has a subbasis equivalent to a disjointly supported basic sequence. This dichotomy allows us to classify the symmetric basic sequences of L. Several applications to Orlicz function spaces are provided.

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