The structure of subspaces in Orlicz spaces between L1 and L2
Abstract
A subspace H of a rearrangement invariant space X on [0,1] is strongly embedded in X if, in H, convergence in X-norm is equivalent to convergence in measure. We obtain necessary and sufficient conditions on an Orlicz function M, under which the unit ball of an arbitrary strongly embedded subspace in the Orlicz space LM has equi-absolutely continuous norms in LM.
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