Here is a more explicit statement of what the theorem asserts.
What the theorem is saying in substance is that ......
This theorem accounts for the term `subharmonic'.
Theorem 2 will form the basis for our subsequent results. [Not: “The Theorem 2”]
In particular, the theorem applies to weakly confluent maps.
Finally, case (E) is completed by again invoking Theorem 1.
At this stage we appeal to Theorem 2 to deduce that ......
Brown's theorem [without the] = the Brown theorem
a theorem of Brown's [= one of Brown's theorems]
......, which, by another theorem of Kimney's, is more than enough to guarantee that $P$ gives $A$ outer measure 1.
Wiener's famous $\langle$renowned/celebrated$\rangle$ theorem
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