Equivariant liftings in Lipschitz-free spaces
Abstract
We consider Banach spaces X that can be linearly lifted into their Lipschitz-free spaces F(X) and, for a group G acting on X by linear isometries, we study the possible existence of G-equivariant linear liftings. In particular, we prove that such lifting exists when G is compact in the strong operator topology, or an increasing union of such groups and F(X) is complemented in its bidual by an equivariant projection. As an example of application, we define and study a complex version of the Lipschitz-free space F(X) when X is a subset of a complex Banach space stable under the action of the circle group.
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