Local Basis of Topological Vector Space

Theorem
Let $\struct {\XX, \tau}$ be a topological vector space.

Let $0_\XX$ denote the zero vector of $\XX$.

Then there exists a local basis $\BB$ of $0_\XX$ with the following properties:


 * $(1): \quad \forall W \in \BB: \exists V \in \BB$ such that $V + V \subseteq W$ (where the addition $V + V$ is meant in the sense of the Minkowski sum)
 * $(2): \quad$ Every $W \in \BB$ is star-shaped (balanced)
 * $(3): \quad$ Every $W \in \BB$ is absorbent.
 * $(4): \quad \displaystyle \bigcap_\BB W = \set {0_\XX}$.

Proof
The proof will be carried out in various steps.

We will construct a collection of star-shaped neighborhoods of $0_\XX$.

Then we will show that it is indeed a local basis with the required properties.

Firstly we define the following set:


 * $\BB_0 := \set {W \in \tau: 0 \in W, W \text{ is star-shaped} }$

$\BB_0$ is a local basis for $0_\XX$
Let $U \ni 0_\XX$ be an open set.

Notice that:
 * $0 \cdot 0_\XX = 0_\XX$

This way we have proved that $\BB_0$ is a local basis for $0_\XX$.

Since $\cdot: K \times \XX \to \XX$ is a continuous mapping, there is a neighborhood of $\tuple {0, 0_\XX} \in K \times \XX$ in the form:


 * $\openint {-\epsilon} \epsilon \times W$

such that:


 * $\cdot \paren {\openint {-\epsilon} \epsilon \times W} \subseteq U$

which means that


 * $\openint {-\epsilon} \epsilon \cdot W \subseteq U$

Let:


 * $\displaystyle G := \bigcup_{\lambda \mathop \in \openint {-\epsilon} \epsilon, \lambda \mathop \ne 0} \lambda W \subseteq U$

We have that:


 * $(1): \quad$ For every $\lambda \ne 0$, the set $\lambda \cdot W$ is open.

Hence $G$ is open as union of open sets.


 * $(2): \quad 0_\XX \in G$ since $0 \in W$.


 * $(3): \quad$ If $x \in G$ then $-x \in G$.

Therefore, $G$ is open, star-shaped, contains $0_\XX$ and $G \subseteq U$.

Condition $(1)$ is satisfied by $\BB_0$
Let $V \in \BB_0$.

We have that $+\left({0_\XX, 0_\XX}\right) = 0_\XX \in W$.

Since $+$ is a continuous mapping and $\BB_0$ is a local basis of $0_\XX$, there exists a $V \in \BB_0$ such that:


 * $+\left({V, V}\right) = V + V \subseteq W$

$\BB_0$ consists of Absorbent Sets
We notice that:


 * $\left({\dfrac 1 n, x}\right) \overset n \to \left({0, x}\right)$

and:


 * $\cdot \left({\left({\dfrac 1 n, x}\right)}\right) \overset n \to \cdot \left({0, x}\right) = 0_\XX$

Thus, there is a $n \in \N$ such that:
 * $\frac 1 n x \in V$

or what amounts to the same thing:
 * $x \in n V$

Condition $(4)$ is satisfied by $\BB_0$
It suffices that we find a $V \in \BB_0$ such that $x \notin V$.

This is possible since $\tau$ is a Hausdorff topology.

The proof is now complete.