The solution is not uniquely defined. For example, for language [aa, ab, bb] the solution might be either [a, b] [a, b], or [aa, ab, bb] and empty string.
The problem can be understood as an instance of the minimum string cover problem (just assume that each string starts with a mandatory begin-string character, and ends with another mandatory end-string character. The allowed covering dictionary would then consist of all prefixes and all suffixes of all words in the input language.
The general string cover problem is NP-hard, but as soon as you impose the rule (here implied by the appearance of begin-string and end-string characters) that only a fixed maximal number of strings (here, two) may cover any given input string, it becomes polynomially solvable.
Here is a C++ implementation of a solver of minimum string cover problems.