The Stacks project

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It is not clear to me why the constructed $\sigma_0$ is a right inverse to the projection $R_0[x_1, \ldots, x_n] / I_0^2 \to R_0[x_1, \ldots, x_n] / I_0 = S_0$: To prove this, we need to check that $x_i - h_i \in I_0$ for each $i$. Since $\sigma$ is a right inverse, we have $x_i - h_i \in I$ and by the construction of $R_0$, $x_i - h_i \in R_0$. But $I_0$ is not necessarily equal to $I \cap R_0$.

This can be fixed in the following way: Since $x_i - h_i \in I$, there exist $b_{ij} \in R[x_1, \ldots, x_n]$ such that $$x_i - h_i = \sum_{j} b_{ij} f_i.$$ If we adjoin the (finitely many) coefficients of the $b_{ij}$ to $R_0$, the above relation also holds in $R_0[x_1, \ldots, x_n]$ and we may conclude.

Thanks and fixed here.

Tried to clarify in a slightly different way. See this.

No, it is not a splitting.

OK, I think that induction is needed but it wasn't clear because of the confusing typo in the last formula in the proof which I fixed here.

Yes, this is much better! Changes are here.

OK, I fixed the issue in the proof of (2) but I think the proof of (4) is correct as written now. Change is here.

OK, I made the changes except for the very last one. Thanks and changes are here.

@#8641 Thanks. I added your example here and I updated the blog post as well.

@#8469 Thanks and fixed here.

Thanks and fixed here.

Thanks.

Going to leave as is.

Going to leave as is.

Going to leave as is.

Thanks and fixed here.

Going to leave as is.

OK. Fixed here.

Excellent catch! I would say this was a bit worse than just a typo. I improved the statement and proof of this lemma a little bit here.