The Stacks project

Does "In this case $\mathcal{T}'$" mean "In this case, any $\mathcal{T}'$ satisfying (1)" or "In this case, there exists some $\mathcal{T}'$ satisfying (1) such that $\mathcal{T}'$?

In the statement, second sentence, one can weaken "$\mathcal{D}'$ is an additive full subcategory of $\mathcal{D}$" to just "$\mathcal{D}'$ is a non-empty preadditive full subcategory of $\mathcal{D}$" (where a preadditive subcategory of a preadditive category is a subcategory with a preadditive structure such that the inclusion functor is additive). Condition (2) implies additivity for $\mathcal{D}$:

Pick any object $X$ in $\mathcal{D}$. By (TR1), the triangle $X\xrightarrow{1_X}X\to 0\to X[1]$ is distinguished. Thus, (2) implies that $\mathcal{D}'$ has a zero object. On the other hand, by Lemma 13.4.11(3) and (TR2), the triangle $Y[-1]\xrightarrow{0}X\to X\oplus Y\to Y$ is distinguished. Now (2) implies that $\mathcal{D}'$ has the direct sum for $X$ and $Y$. This shows that $\mathcal{D}'$ is additive.

Going to leave as is.