Paper detail

Free locally convex spaces with a small base

The paper studies the free locally convex space $L(X)$ over a Tychonoff space $X$. Since for infinite $X$ the space $L(X)$ is never metrizable (even not Fréchet-Urysohn), a possible applicable generalized metric property for $L(X)$ is welcome. We propose a concept (essentially weaker than first-countability) which is known under the name a $\mathfrak{G}$-base. A space $X$ has a {\em $\mathfrak{G}$-base} if for every $x\in X$ there is a base $\{ U_α: α\in\mathbb{N}^\mathbb{N}\}$ of neighborhoods at $x$ such that $U_β\subseteq U_α$ whenever $α\leqβ$ for all $α,β\in\mathbb{N}^\mathbb{N}$, where $α=(α(n))_{n\in\mathbb{N}}\leq β=(β(n))_{n\in\mathbb{N}}$ if $α(n)\leqβ(n)$ for all $n\in\mathbb{N}$. We show that if $X$ is an Ascoli $σ$-compact space, then $L(X)$ has a $\mathfrak{G}$-base if and only if $X$ admits an Ascoli uniformity $\mathcal{U}$ with a $\mathfrak{G}$-base. We prove that if $X$ is a $σ$-compact Ascoli space of $\mathbb{N}^\mathbb{N}$-uniformly compact type, then $L(X)$ has a $\mathfrak{G}$-base. As an application we show: (1) if $X$ is a metrizable space, then $L(X)$ has a $\mathfrak{G}$-base if and only if $X$ is $σ$-compact, and (2) if $X$ is a countable Ascoli space, then $L(X)$ has a $\mathfrak{G}$-base if and only if $X$ has a $\mathfrak{G}$-base.