Let us assume that list one has m elements and list two has n elements , m>n. If elements are not numerically ordered , it seems that they are not , total number of comparison steps - that is the cost of the method - factor mxn - n^2/2. In this case cost factor is about 50000x49999.
Keeping both lists ordered will be the optimal solution. If lists are ordered , cost of comparison of these will be factor m. In this case that is about 50000. This optimal result will be achieved , when both of lists are iterated via two cursor. This method can be represented in code as follows :
while(i<List1.size() && j<List2.size())
If it is possible for you to keep lists ordered all the time , this method will make difference. Also I consider that it is not possible split and compare unless lists are ordered.