There are some nice connections between properties of sets and properties of their characteristic functions.
For instance:
a set $C\subset \mathbb{R}$ is closed (resp. open) IFF the characteristic function $\mathbb{1}_C$ is upper semi-continuous (resp. lower semi-continuous).
A set $E\subset \mathbb{R}^d$ has finite perimeter IFF $\mathbb{1}_E$ has bounded variation (in the distributional sense).
There are also interesting results in one direction, i.e. without an equivalence.
I would be interested in similar equivalences/implications for quasicontinuity or any related notion like cliquishness. The former harks back to Baire and Volterra and is defined as follows:
a function $f:\mathbb{R}\rightarrow \mathbb{R}$ is quasicontinuous at $x\in \mathbb{R}$ if for any $\epsilon>0$ and $\delta>0$ there is some interval $(a, b)\subset B(x, \delta)$ such that $(\forall y\in (a, b))(|f(x)-f(y)|<\epsilon)$.
Note that in this definition, we need not have that $x\in (a, b)$.
I welcome any (fairly abstract) notion/equivalence, also stemming from logic/set theory.
