Motivation. Recently I've been trying to understand how well- or ill-behaved are the many different powerset topologies one can put on the powerset of a topological space, and in particular I'm trying to understand whether there exists a *really* nice topology on the powerset of a topological space in the sense of this question.
So one of the ideas that I'm trying to explore is whether we could get such a well-behaved "powerset topological space" by passing first to simplicial sets, as in that setting it's reasonably clear how to define the "powerset of a simplicial set".
Given a simplicial set $X_\bullet$, define its powerset simplicial set $\mathcal{P}_\bullet(X)$ as the composition $$\Delta^\mathsf{op}\xrightarrow{X_\bullet}\mathsf{Set}\xrightarrow{\mathcal{P}}\mathsf{Set},$$ where $\mathcal{P}$ is the covariant powerset functor.
How do powersets of simplicial sets compare with powersets of topological spaces?
- Is the geometric realisation $|\mathcal{P}_\bullet(X)|$ of the powerset of $X_\bullet$ related in any way to the powerset topological space $\mathcal{P}(|X_\bullet|)$ of the geometric realisation of $X_\bullet$, for an appropriate topology on $\mathcal{P}(|X_\bullet|)$, like the Vietoris topology, the Fell topology, etc.?
- Again choosing an appropriate topology on the powerset $\mathcal{P}(X)$ of a topological space $X$, are the simplicial sets $\mathrm{Sing}_\bullet(\mathcal{P}(X))$ and $\mathcal{P}(\mathrm{Sing}(X))_\bullet$ related?
- Lastly, starting with a topological space $X$, are $\mathcal{P}(X)$ (with an appropriate topology) and $|\mathcal{P}_\bullet(\mathrm{Sing}(X))|$ related?
