A partial order on a job set is called consistent, if it has a linear extension which is an optimal solution to the total tardiness problem of the job set. The concept of proper augmentations of consistent partial orders is based on Emmons′ well-known dominance theorem. In this paper, we address the question of whether the proper augmentation of a consistent partial order always results in a partial order which is also consistent. By giving an example, we show that this need not be true in general. However, as the main result of this paper, we prove that the answer to this question is affirmative for the normal procedure, i.e., the procedure of proper augmentations beginning from “null”. Therefore, this paper closes the gap between Emmons′ dominance theorem and the normal procedure of augmentations of partial orders.