remark. the grand plan [ag-0002]
remark. the grand plan [ag-0002]
We will use [kriz2021introduction] as a holistic guide to the organization of materials, which has done a great job of having the minimal prerequisites, being self-contained, and covering most of the topics that concern us, including the geometric motivation.
For a similar purpose, we use the formalization papers [bordg2022simple] and [buzzard2022schemes] to guide the path, at least the part towards schemes, and their counterparts in the Mathlib of Lean 4.
For prerequisites in basic algebra and commutative algebra, we will use [knapp2006basic] and [knapp2007advanced], and notes by Andreas Gathmann [gathmann2023plane][gathmann2013commutative] and David Mehrle [mehrle2015commutative]. For the geometric motivation and intuition, we will use [cox1997ideals] and [borisov2024adventures].
For upstream treatment of algebraic geometry, we will use [grothendieck1964elements] (particularly the English translation available at ryankeleti/ega) and [fantechi2006fundamental]. For modern notes, we will use [vakil2024rising], [gathmann2022algebraic] and [mehrle2017algebraic], with an eye on the classic textbook [hartshorne1977graduate].
We also need to tap into the language of Stacks in a modern setting, as treated in [khan2023lectures], with preliminaries on \(\infty \)-categories and derived categories.
See the plan for notes on algebraic geometry for an early discussion of the plan.