On linearisation and uniqueness of preduals

Abstract

We study strong linearisations and the uniqueness of preduals of locally convex Hausdorff spaces of scalar-valued functions. Strong linearisations are special preduals. A locally convex Hausdorff space F() of scalar-valued functions on a non-empty set is said to admit a strong linearisation if there are a locally convex Hausdorff space Y, a map δ Y and a topological isomorphism T() Yb' such that T(f) δ= f for all f∈F(). We give sufficient conditions that allow us to lift strong linearisations from the scalar-valued to the vector-valued case, covering many previous results on linearisations, and use them to characterise the bornological spaces F() with (strongly) unique predual in certain classes of locally convex Hausdorff spaces.