There are many incarnations of what is known as a continuum, e.g.,

1. continuum in set theory: the set R.

2. coninuum in topology: Hausdorff space. Distinct points belong to disjoint neighbourhoods.

I can suggest an approach in terms of a Hausdorff space. Let x and y be distinct points in a metric Hausdorff space X endowed with an Efremovic proximity relation. Let Nx, Ny be disjoint neighbourhoods of x, y, respective, where, for example,

\[

N_x = \left\{y\in X: d(x,y) < \varepsilon\right\},

\]

with $\varepsilon > 0$ and $d$ is the standard distance between x and y. Then Nx and Ny are connected, provided

\[

\mbox{cl}(A) \cap \mbox{cl}(B) \neq \emptyset.

\]

In other words, cl(Nx) and cl(Ny) have at least one point in common and cl(Nx) and cl(Ny) are then adjacent to each other. In other words, Nx and Ny are disjoint but cl(Nx) and cl(Ny) are not disjoint. If every pair of closures of disjoint neighbourhoods is connected in a subspace of X, then the subspace is locally connected.

One question to consider is this: what if Nx = {x} and Ny = {y}. Does the above line of reasoning work?