The Stacks project

I think the notation may be a little bit confusing: The morphism denoted as $(0,1)$ in $(X, X \oplus Y, Y, (1, 0), (0, 1), 0)$ is not the same morphism as the corresponding one in $F(1, 0) \oplus F(0, 1) : F(X) \oplus F(Y) \to F(X \oplus Y)$. To make the notation unambiguous, I would write $(X, X \oplus Y, Y,\binom{1}{0}, (0, 1), 0)$ for the former expression and $F\binom{1}{0}\oplus F\binom{0}{1}:F(X)\oplus F(Y)\to F(X\oplus Y)$ for the latter one. (This is the notation from https://ncatlab.org/nlab/show/matrix+calculus .)

And about the "we omit the rest of the argument": wouldn't it suffice to invoke 12.7.1?

Also: instead of the expression at the beginning $$(F(0), F(0), F(0), 1_{F(0)}, 1_{F(0)}, F(0))$$ shouldn't we write the following expression? $$(F(0), F(0), F(0), 1_{F(0)}, 1_{F(0)}, \xi_0\circ F(0)).$$ I mean, both expressions coincide after we show that $F(0)=0$, but the expression is written before $F(0)=0$ is proven.

OK, it turns out that the mild notational abuse already occurred in Lemma 13.4.11. I added the reference to Lemma 12.7.1 and slightly improved the text. Thanks! See changes.