We say that an edge colouring breaks an automorphism if some edge is mapped to an edge of a different colour. We say that the colouring is distinguishing if it breaks every non-identity automorphism. We show that such a colouring can be chosen from any set of lists associated to the edges of a graph G, whenever the size of each list is at least Δ − 1, where Δ is the maximum degree of G, apart from a few exceptions. This holds both for finite and infinite graphs. The bound is optimal for every Δ ≥ 3, and it is the same as in the non-list version.
Kwaśny et al. (Tue,) studied this question.