Position of L(X, Y) in Lip0(X, Y)

Abstract

We prove that L(X,Y) is complemented in Lip0(X, Y) (via a norm-one projection) provided that Y is a dual space. Next, we introduce a vector-valued Lipschitz-free space FY(X), a linear contraction βXY: FY(X) Y and prove that the quotient space Lip0(X, Y)/L(X, Y) is isometrically isomorphic to L((βXY), Y) whenever Y is injective. We also consider a Y-valued duality pairing between Lip0(X, Y) and FY(X) and obtain a necessary and sufficient condition for a Lipschitz map to be linear. As an application, we describe (βRR) as the pre-dual of the quotient space L∞(R)/R where R is the set of all constant maps on R.