Some remarks on the structure of Lipschitz-free spaces
Abstract
We give several structural results concerning the Lipschitz-free spaces F(M), where M is a metric space. We show that F(M) contains a complemented copy of 1(), where =dens(M). If N is the net in a finite dimensional Banach space X, we show that F( N) is isomorphic to its square. If X contains a complemented copy of p, c0 then F( N) is isomorphic to its 1-sum. Finally, we prove that for all X C(K) spaces F( N) are mutually isomorphic spaces with a Schauder basis.
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