The $k$-token graph $T_k(G)$ is the graph whose vertices are the $k$-subsets
of vertices of a graph $G$, with two vertices of $T_k(G)$ adjacent if their
symmetric difference is an edge of $G$. We explore when $T_k(G)$ is a
well-covered graph, that is, when all of its maximal independent sets have the
same cardinality. For bipartite graphs $G$, we classify when $T_k(G)$ is
well-covered. For an arbitrary graph $G$, we show that if $T_2(G)$ is
well-covered, then the girth of $G$ is at most four. We include upper and lower
bounds on the independence number of $T_k(G)$, and provide some families of
well-covered token graphs.