Causal sets
In mathematics, if a topological space is said to be complete, it may mean:
- that has been equipped with an additional Cauchy space structure which is complete,
- e. g., that it is a complete uniform space with respect to an aforementioned uniformity,
- e. g., that it is a complete metric space with respect to an aforementioned metric;
- e. g., that it is a complete uniform space with respect to an aforementioned uniformity,
- or that has some topological property related to the above:
- that it is completely metrizable (often called (metrically) topologically complete),
- or that it is completely uniformizable (also called topologically complete by some authors).