Do I remember a remark in "Sketch of a program" or "Letter to Faltings" correctly, that acc. to Grothendieck anabelian geometry should not only enable finiteness proofs, but a proof of FLT too? If yes, how?
Edit: This has nothing to do with anabelian issues, but sounds interesting and I don't see where else to include the link: "How we prove Fermat's Last Theorem these days ... a gentle survey on how FLT can be proven after the works of Khare, Taylor, Wintenberger et al. on Serre’s Conjecture. The proof is still quite technical, but new proofs involve less amount of ad hoc methods/factsIn this transcript, and could be understood asIllusie makes a combination of “standard” techniquesremark that are conceptually establishedGrothendieck looked for a connection between "FLT" and generalized"higher stacks". Intended for non-expertsBTW, here a note on (acc." Could someone tell us more about that? to Illusie) Grothendieck's favored landscape.
