PlanetPhysics/Long March Across Galois Theory

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A. Grothendieck's Long March across the Theory of (\'Evariste) Galois edit

"La Longue Marche \'a travers la th\'eorie de Galois" ("The Long March Through Galois Theory") is an approximately 1600--page handwritten manuscript produced by Grothendieck during the years 1980--1981, containing many of the ideas leading to the "Esquisse d'un Programme".

``Typed in Tex, it comes out to about 600 pages. It goes together with a further 1,000 pages or so of additional notes and sections which have not yet been read or typed. Many of the major themes were summarised in the 1983 manuscript "Esquisse d'un Programme", and in particular studying the Teichm\"uller theory.

The Table of Contents for this important work by Alexander Grothendieck was originally compiled in French by the author and is reproduced here after the English Translation of the major parts of the Long March.

Table of Contents for the Long March across Galois Theory edit

Multi-Galois Toposes (topoi)
Applications to topos coverings
Pro-multi-Galois variants
Complements
Introducing the arithmetic context; an `anabelian' (non-Abelian) fundamental conjecture
Local analysis of $(X,S)$ for $s\in S$
Reformulation of the conjecture (the necessary `purgatorium'...)
A taxonomic reflexion
Tangential structure at $s\in S$ (sections of second type extensions)
Adjusting the hypotheses
Conditions on the groupoid systems originating from geometric considerations (in the nonabelian case, the groupoid system can be expressed

in terms of outer groups)

Returning to the arithmetic case: the Galois--type formulation, p. 53
A cohomological digression, p.58
Returning to the topological case: critical orbits
Returning to the concept of cyclic group
Application to the finite subgroups of $Aut_{ext}$ (the discrete case, para.18)
Tour of Teichm\"uller (spaces)
Digression: the description of 2-isotopic categories of algebraic curves p.116
21. Teichm\"uller spaces p.126
23. Returning to the surfaces of (finite) groups of operators (`formulating the equations' of the problem)
"Special" Teichm\"uller groups #The case of "two groups of operators"
{\mathbf 26.} Profinite Teichm\"uller Groups, connection with the modular Teichm\"uller topos, conjecture
29. Critique of the previous approach
31. Digression: a finite group $G$ over a profinite cyclic group $\pi$
{\mathbf 32} Returning to the arithmetic aspects: a remarkable reconstruction of all of the \'etale topos of a complete algebraic curve starting from an open nonabelian space...
33. A topological digression: anti-involutions of compact, oriented surfaces
35. Injectivity of

$\Gamma _{Q}\to Autext_{lac}({\mathcal {T}}_{1,1}^{+})=Autext_{lac}SL(2,{\mathcal {Z}}^{)}$

36. The isomorphism $\Gamma _{Q}\cong \Gamma _{1,1}$ and the injectivity

of $\Gamma _{Q}\to Autext_{lac}({\mathcal {T}}_{1,1}^{+})=Autext_{lac}SL(2,{\mathcal {Z}}^{)}$

37. Modules of elliptic curves via Legendre functions, or

$M_{1,1}[2]'\cong {\mathcal {U}}_{0,3}\cong M_{0,4}^{!}.$

Alexander Grothendieck's original document in French: edit

1. Topos multigaloisiens
2. Application aux $rev{\widehat {e}}tements$ des topos
3. Variantes pro-multigaloisiennes
4. Compl\'ements, remords
5. Introduction du contexte arithm\'etique; conjecture anab\'elienne fondamentale
6. Analyse locale de $(X,S)$ en un $s\in S$
7. Reformulation `bord\'elique' de la conjecture (le purgatoire n\'ecessaire...)
8. R\'eflexion taxonomique (distinction des cas o\'u le purgatoire s\'am\'enage un peu...)
9. Structure tangentielle en les $s\in S$ (sections d'extensions "de deuxi\'eme type")
10. Ajustement des hypoth\'eses (remords)
11. Conditions sur les syst\'emes de groupo\"ides obtenus \'a partir de situations g\'eom\'etriques (o\'u on se convaincu aussi que le bordel groupo\"idal peut s\'exprimer compl\'etement, dans les cas anab\'eliens, par les groupes ext\'erieurs \'a lacets)
13. Retour au cas arithm\'etique; formulation `galoisienne' . 53
13 bis. Retour sur la notion de groupe 'a lacets . . 56
14. Digression cohomologique (sur le "`bouchage de rous") .. 58
15. Retour sur le cas topologique: orbites critiques des scindages d'extensions; application aux sous--groupes finis de $Autext_{lac}$ (cas discret; cf. aussi para.18)
16. Bouchage et forage de trous: pr\'eliminaires topologiques g\'en\'eraux . . . . 79
17. Compl\'ement au para. 15; sous--groupes de groupes \'a lacets . . . . . . . . 89
18. Forage de trous; applications aux sous--groupes finis de Autextlac() . . . 91 (cas discret)
19. Tour de Teichm\"uller . . . . . . . . . . . . . . . . . . 102
20. Digression: description 2--isotopique de la cat\'egorie des isomorphismes topologiques
21. Les espaces de Teichm\"uller . . . . . . . . . . . . . . . . 126 Manque le para 22.
22 [notation en marge]
23. Retour sur les surfaces \'a groupes (finis)dâ€™op\'erateurs ("mise en \'equations" du probl\'eme)
24. Essai de d\'etermination de $A^{0\Gamma }$ ; lien avec les relations $\pi _{(g,\nu ,\nu +n-1)}^{\Gamma }={1}$ programme de travail
25. Groupes de Teichm\"uller "sp\'eciaux" . . . . . . . . . . . . . 148
25bis. "Cas des deux groupes" d'op\'erateurs; retour sur les notations . . . . 155
26. Groupes de Teichm\"uller profinis, discr\'etifications et pr\'ediscr\'etifications; lien avec le topos modulaire de Teichm\"uller, conjecture $h{\widehat {a}}tive$
27. Changement de type $(g,\nu ):a)$ bouchage de trous . 172
28. Changement de type $(g,\nu ):b)$ passage \'a un $rev{\widehat {e}}tements$ fini (la conjecture $h{\widehat {a}}tive$ grince...)
29. Critique de l'approche pr\'ec\'edente . . . . 186 (on rajuste les notions et les conjectures)
30. Propri\'et\'es des ${\mathcal {N}}_{g},\Gamma _{g,\nu }$ : . . . . . . . 192 a) Propri\'et'es li\'ees aux sous-groupes finis de Teichm\"uller
31. Digression sur les rel\'evements d'une action ext\'erieure . . . . . . . . 198 d'un groupe fini $G$ sur un groupe profini \'a lacets
32. Retour sur les aspects arithm\'etiques du bouchage de trous: relations entre $\Gamma _{g,\nu }$ et $\Gamma _{g,\nu -1}$ (o\'u on reconstitue, sans le dire, tout le topos \'etale d'une courbe alg\'ebrique compl\'ete, \'a partir du $\pi _{1}$ d'un ouvert anab\'elien...)
33. Digression topologique: anti--involutions des surfaces orient\'ees compactes . 221 (en laissant de $c{\widehat {o}}t$ \'e d'abord le cas "a trous")
33 bis. Relation entre les ${\mathcal {N}}_{g,\nu },\Gamma _{g,\nu }$ , pour g variable .239 (\'etude des $rev{\widehat {e}}tements$ finis)
34. Description heuristique profinie de la cat\'egorie des courbes alg\'ebriques d\'efinies sur des sous--extensions finies $K$ de $Q_{0}/Q$
35. L'injectivit\'e de $\Gamma _{Q}\to Autext_{lac}({\widehat {\pi }}(0,3)$ . 249
36. L'isomorphisme $\Gamma _{Q}\cong \Gamma _{1,1}$ . et l'injectivit\'e de $\Gamma _{Q}\to Autext_{lac}({\mathcal {T}}_{1,1}^{+})=Autext_{lac}SL(2,{\mathcal {Z}}^{)}$
37. Modules des courbes elliptiques via Legendre, ou $M_{1,1}[2]'\cong {\mathcal {U}}_{0,3}\cong M_{0,4}^{!}.$

All Sources edit

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References edit

↑ Allyn Jackson. March 1999. The IH\'ES at Forty., 9 pp. (The IH\'ES was founded in 1958 by mathematician/ mathematical physicist L\'eon Motchane, and followed for many years Robert Oppenheimer council. L\'eon was born in St. Petersburg in 1900 to Swiss parents.)
↑ DAVID AUBIN, Un pacte singulier entre math\'ematiques et industrie, La Recherche, No. 313 (October 1998), 98--103.
↑ PIERRE CARTIER, La folle journ\'ee, de Grothendieck \'a Connes et Kontsevich, Les Relations entre les Math\'ematiques et la Physique Th\'eorique, Festschrift for the 40th anniversary of the IH\'ES, Publications de l'IH\'ES, October 1998.

[AJ-IHES99-1] Allyn Jackson. March 1999. The IH\'ES at Forty., 9 pp. (The IH\'ES was founded in 1958 by mathematician/ mathematical physicist L\'eon Motchane, and followed for many years Robert Oppenheimer council. L\'eon was born in St. Petersburg in 1900 to Swiss parents.)

[DA98[2]-2] DAVID AUBIN, Un pacte singulier entre math\'ematiques et industrie, La Recherche, No. 313 (October 1998), 98--103.

[PC98[2]-3] PIERRE CARTIER, La folle journ\'ee, de Grothendieck \'a Connes et Kontsevich, Les Relations entre les Math\'ematiques et la Physique Th\'eorique, Festschrift for the 40th anniversary of the IH\'ES, Publications de l'IH\'ES, October 1998.

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