The triangle inequality seems much stronger than necessary for a lot of analysis. So I will define a "loose metric" on a set $X$ to be a function $d \colon X \times X \to [0,\infty)$ with the following properties:
- $d(x,y)=d(y,x)\ $ for all $x,y \in X;$
- every $\, x,y \in X\ $ has $\ d(x,y)=0\ $ if and only if $\ x=y$;
- there exists a function $\rho \colon [0,\infty) \to [0,\infty]$, with $\rho(t) \to 0$ as $t \to 0$, such that for all $x,y,z \in X$, $$ | d(x,z) - d(y,z) | \,\leq\, \rho(\, d(x,y) \, )\text{.} $$
Is the topology generated by a loose metric necessarily metrisable?
Obviously, by "the topology generated by a loose metric $d$ on $X$", I mean the collection of all $d$-open subsets of $X$, where a set $U \subset X$ is called $d$-open if for all $x \in U$ there exists $\delta>0$ such that $\{y \in X : d(x,y) < \delta\} \subset U$. I believe it is easy to show that this topology is a regular Hausdorff topology, and so the Nagata-Smirnov metrisation theorem would give that it is sufficient to show that the topology has a $\sigma$-locally finite basis. However, I suspect that there will be a more direct way of constructing a classical metric on $X$ that is topologically equivalent to a given loose metric $d$.
