Is the free locally convex space L(X) nuclear?
Abstract
Given a class P of Banach spaces, a locally convex space (LCS) E is called multi- P if E can be isomorphically embedded into a product of spaces that belong to P. We investigate the question whether the free locally convex space L(X) is strongly nuclear, nuclear, Schwartz, multi-Hilbert or multi-reflexive. If X is a Tychonoff space containing an infinite compact subset then, as it follows from the results of Aus, L(X) is not nuclear. We prove that for such X the free LCS L(X) has the stronger property of not being multi-Hilbert. We deduce that if X is a k-space, then the following properties are equivalent: (1) L(X) is strongly nuclear; (2) L(X) is nuclear; (3) L(X) is multi-Hilbert; (4) X is countable and discrete. On the other hand, we show that L(X) is strongly nuclear for every projectively countable P-space (in particular, for every Lindel\"of P-space) X. We observe that every Schwartz LCS is multi-reflexive. It is known that if X is a kω-space, then L(X) is a Schwartz LCS Chasco, hence L(X) is multi-reflexive. We show that for any first-countable paracompact (in particular, metrizable) space X the converse is true, so L(X) is multi-reflexive if and only if X is a kω-space, equivalently, if X is a locally compact and σ-compact space. Similarly, we show that for any first-countable paracompact space X the free abelian topological group A(X) is a Schwartz group if and only if X is a locally compact space such that the set X(1) of all non-isolated points of X is σ-compact.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.