Some natural subspaces and quotient spaces of L1

Abstract

We show that the space Lip0( Rn) is the dual space of L1( Rn; Rn)/N where N is the subspace of L1( Rn; Rn) consisting of vector fields whose divergence vanishes. We prove that although the quotient space L1( Rn; Rn)/N is weakly sequentially complete, the subspace N is not nicely placed - in other words, its unit ball is not closed for the topology τm of local convergence in measure. We prove that if is a bounded open star-shaped subset of Rn and X is a closed subspace of L1() consisting of continuous functions, then the unit ball of X is compact for the compact-open topology on . It follows in particular that such spaces X, when they have Grothendieck's approximation property, have unconditional finite-dimensional decompositions and are isomorphic to weak*-closed subspaces of l1. Numerous examples are provided where such results apply.