Whenever the dimension drops by 1, the rank drops by at most $Z$.
We denote the complement of $A$ by $A^c$ whenever it is clear from the context with respect to which larger set the complement is taken.
Next, (1) shows that (2) holds whenever $g=f(n)$ for some $n$.
Suppose that $T^*$ is continuous whenever $T$ is.
A semilattice $A$ has breadth $n$ iff whenever $E< A$ and $|E|>n$, there is an $x$ such that ......
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