This statement is false. Consider these two languages over Σ = {a}:

L_{1} = { a^{n} | n is a power of two } ∪ { ε }

L_{2} = { a^{n} | n is *not* a power of two } ∪ { ε }

Neither of these languages are regular (the first one can be proven to be nonregular by using the Myhill-Nerode theorem, and the second is closely related to the complement of L_{1} and can also be proven to be nonregular.

However, I'm going to claim that L_{1}L_{2} = a*. First, note that any string in the concatenation L_{1}L_{2} has the form a^{n} and therefore is an element of a*. Next, take any string in a*; let it be a^{n}. If n is a power of two, then it can be formed as the concatenation of a^{n} from L_{1} and ε from L_{2}. Otherwise, n isn't a power of two, and it can be formed as the concatenation of ε from L_{1} and a^{n} from L_{2}. Therefore, L_{1}L_{2} = a*, so the theorem you're trying to prove is false.

Hope this helps!

tried? – Damien_The_Unbeliever Apr 7 '12 at 15:21