An extension result for (LB)-spaces and the surjectivity of tensorized mappings

Abstract

We study an extension problem for continuous linear maps in the setting of (LB)-spaces. More precisely, we characterize the pairs (E,Z), where E is a locally complete space with a fundamental sequence of bounded sets and Z is an (LB)-space, such that for every exact sequence of (LB)-spaces 0 → X Y → Z → 0 the map L(Y,E) L(X, E), ~ T T is surjective, meaning that each continuous linear map X E can be extended to a continuous linear map Y E via , under some mild conditions on E or Z (e.g. one of them is nuclear). We use our extension result to obtain sufficient conditions for the surjectivity of tensorized maps between Fr\'echet-Schwartz spaces. As an application of the latter, we study vector-valued Eidelheit type problems. Our work is inspired by and extends results of Vogt [24].