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Groups Interprétable in Theories of Fields 11model theory to Diophantine geometry. In the characteristic zero case, the relevantgroups are the definable subgroups of the group of rational points of Abelianvarieties in differentially closed fields (Mordell-Lang conjecture for function fields[13]), in generic difference fields (the Manin-Mumford conjecture [15], [5] and theTate-Voloch conjecture for semi-Abelian varieties defined over Q p [25], [26]). In thecharacteristic p case, the relevant groups are: the oo-definable divisible subgroupsof the group of rational points of semi-Abelian varieties in separably closed fields(the Mordell-Lang conjecture for function fields [13]) and the definable subgroups ofthe additive groups in generic difference fields of characteristic p (Drinfeld modules[27]).One should note that, in fact, separably closed fields are just another instanceof a field with extra operators (derivations or automorphisms): one can equip anyseparably closed field L of finite degree of imperfection, with an infinite family ofHasse derivations in such a way that the resulting structure is bi-definably equivalentwith L considered as a structure in the language described in section 3.2.. Thereare many interesting other possible types of "enriched" fields in this sense wherethe complete analysis of the model theoretic structure remains to be done.Finally, one crucial step towards possible further applications of the fine studyof finite rank definable sets to geometry would be an understanding of the structureinduced on the so-called trivial or disintegrated definable (or infinitely definable)minimal sets, that is the minimal sets such that the induced pregeometry is disintegrated.This condition immediately rules out definable groups. The absence ofany well-understood algebraic structure living on these "trivial" sets makes themvery difficult to analyze. The only results obtained so far are in the context ofdifferentially closed fields of characteristic 0: Hrushovski ([12]), building on someresults of Jouanolou ([17]), showed that in any trivial strongly minimal set definedby a differential equation of order one, the induced pregeometry is locally finite.The question of whether this is true for higher order equations is still open.References[1] D. Abramovic & F. Voloch, Towards a proof of the Mordell-Lang conjecture incharacteristic p, Intern. Math. Research Notices (IMRN), 2 (1992), 103-115.[2] T. Blossier, Ensembles minimaux localement modulaires, Thèse de Doctorat,Université Paris 7, 2001.[3] E. Bouscaren, Model-theoretic versions of Weil's theorem on pre-groups, inThe Model Theory of Groups, (A. Nesin & A. Pillay, editors), Notre DameUniversity Press, 1989.[4] E. Bouscaren, Proof of the Mordell-Lang conjecture for function fields, in Modeltheory and algebraic geometry (E. Bouscaren, editor), Lecture Notes in Mathematics,Vol. 1696, Springer-Verlag, 1998.[5] E. Bouscaren, Théorie des modèles et conjecture de Manin-Mumford (d'aprèsEhud Hrushovski), Séminaire Bourbaki, Vol. 1999/2000, Astérisque No. 276(2002), 137^159.[6] E. Bouscaren & Françoise Delon, Groups definable in separably closed fields,Transactions of the A.M.S., 354 (2002), 945^966.
12 E. Bouscaren[7] E. Bouscaren & Françoise Delon, Minimal groups in separably closed fields,The Journal of Symbolic Logic, 67 (2002), 239^259.[8] A. Buium, Differential Algebra and Diophantine Geom., Hermann, Paris, 1994.[9] Z. Chatzidakis & E. Hrushovski, The model theory of difference fields, Transactionsof the A.M.S, Vol. 351 (1999), 2997-3071.[10] Z. Chatzidakis, E. Hrushovski & Y. Peterzil, The model theory of differencefields II, Proceedings of the London Math. S oc. (to appear).[11] F. Delon, Separably closed fields, in Model Theory and Algebraic Geometry, E.Bouscaren (Ed.), Lecture Notes in Mathematics 1696, Springer-Verlag, 1998.[12] E. Hrushovski, ODE's of order 1 and a generalisation of a theorem ofJouanolou's, Manuscript, 1995.[13] E. Hrushovski, The Mordell-Lang conjecture for function fields, Journal of theA.M.S., 9 (1996), 667^690.[14] E. Hrushovski, Geometric model theory, in Proceedings of the InternationalCongress of Mathematicians, Berlin, Vol. I (1998), Doc. Math., 281^302.[15] E. Hrushovski, The Manin-Mumford conjecture and the model theory of differencefields,Annals of Pure and Applied Logic, 112 (2001), 43^115.[16] E. Hrushovski & B. Zilber, Zariski Geometries, Journal of the A.M.S., 9 (1996),1-56.[17] J.P. Jouanolou, Hypersurfaces solutions d'une équation de Pfaff analytique,Mathematische Annalen, 232 (1978), 239^245.[18] P. Kowalski & A. Pillay, A note on groups definable in difference fields, preprint,2000.[19] M. Messmer, Groups and fields interprétable in separably closed fields, Transactionsof the A.M.S., 344 (1994), 361^377.[20] A. Pillay, Differential algebraic groups and the number of countable differentiallyclosed fields, in Model Theory of Fields, D. Marker, M. Messmer & A.Pillay, Lecture Notes in Logic 5, Springer, 1996.[21] A. Pillay, Some foundational questions concerning differential algebraic groups,Pacific Journal of Math., 179 (1997), 179-200.[22] A. Pillay, Model Theory and Diophantine geometry, Bulletin of the A.M.S., 34(1997), 405-422.[23] A. Pillay, Model theory of algebraically closed fields, in Model theory and algebraicgeometry (E. Bouscaren, editor), Lecture Notes in Mathematics, Vol.1696, Springer-Verlag, 1998.[24] A. Pillay & M. Ziegler, Jet spaces of varieties over differential and differencefields, preprint, 2002.[25] T. Scanlon, p-adic distance from torsion points of semi-Abelian varieties, Journalfür dir Reine und Angewandte Mathematik, 499 (1998), 225-236.[26] T. Scanlon, The conjecture of Tate & Voloch on p-adic proximity to torsion,Intern. Math. Research Notices (IMRN), 17 (1999), 909-914.[27] T. Scanlon, Diophantine geometry of the torsion of a Drinfeld module, preprint1999.[28] T. Scanlon, Diophantine geometry from model theory, Bulletin of SymbolicLogic, 7 (2001), 37^57.
Page 1 and 2: Beijing 2002August 20-28Proceedings
Page 3 and 4: ContentsSection 1. LogicE. Bouscare
Page 5 and 6: R. Pandharipande: Three Questions i
Page 7 and 8: Section 1. LogicE. Bouscaren: Group
Page 9 and 10: 4 E. Bouscaren2. Different notions
Page 11 and 12: 6 E. BouscarenWe now consider an al
Page 13 and 14: 8 E. Bouscarendimension would need
Page 15: 10 E. Bouscaren1. Either G is not o
Page 19 and 20: 14 J. Denef F. Loeserthis theory to
Page 21 and 22: 16 J. Denef F. Loeserwill require m
Page 23 and 24: 18 J. Denef F. Loeserseries P P (T)
Page 25 and 26: 20 J. Denef F. Loeserfor all m> n.
Page 27 and 28: 22 J. Denef F. Loeseri > 1. One ver
Page 29 and 30: ICM 2002 • Vol. II • 25-33Autom
Page 31 and 32: Automorphism Groups of Saturated St
Page 39 and 40: ICM 2002 • Vol. II • 37-45Repre
Page 41 and 42: 3. The Blanchfield pairingRepresent
Page 43 and 44: Representations of Braid Groups 41n
Page 45 and 46: Representations of Braid Groups 43A
Page 47 and 48: Representations of Braid Groups 45T
Page 49 and 50: 48 A.Bondal D.Orlovis believed to b
Page 51 and 52: 50 A.Bondal D.OrlovDefinition 4 [BK
Page 53 and 54: 52 A.Bondal D.OrlovLet Y be a smoot
Page 55 and 56: 54 A.Bondal D.OrlovIn particular, w
Page 57 and 58: 56 A.Bondal D.Orlov[BVdB] Bondal A.
Page 59 and 60: 58 M. Levine(PB) Let £ be a rank r
Page 61 and 62: 60 M. Levine2. Let 1Z d%m (X) be th
Page 63 and 64: 62 M. LevineNow, if P = P(ci,. •
Page 65 and 66: 64 M. LevineProof. For CH*, this us
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66 M. Levineis an isomorphism. Sinc
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68 Cheryl E. Praegeranalysis. Analo
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70 Cheryl E. Praegers-arc-transitiv
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72 Cheryl E. Praegercase a good kno
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74 Cheryl E. Praeger5. Simple group
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76 Cheryl E. Praeger[15] C. H. Li,
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78 Markus Rost1. Norm varietiesAll
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80 Markus RostWe apply the degree f
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82 Markus Rost4. Hubert's 90 for sy
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84 Markus RostFor n = 2 one can tak
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ICM 2002 • Vol. II • 87^92Dioph
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Diophantine Geometry over Groups an
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Diophantine Geometry over Groups an
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ICM 2002 • Vol. II • 93^103None
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Noncommutative Projective Geometry
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106 Dimitri Tamarkinalgebra and def
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108 Dimitri TamarkinThe product on
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110 Dimitri TamarkinProof. Let F =
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112 Dimitri Tamarkin2.5.9.Similarly
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114 Dimitri TamarkinComputeJ2,jl(a
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116 Dimitri Tamarkin3.2.1.To descri
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ICM 2002 • Vol. II • 119-128Con
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Converse Theorems, Functoriality, a
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Constructing and Counting Number Fi
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ICM 2002 • Vol. II • 139-148Ana
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Analyse p-adique et Représentation
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ICM 2002 • Vol. II • 149-162Equ
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Equiv. Bloch-Kato Conjecture and No
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[17;[is;[19;[20;[21[22[23;[24;[25;[
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ICM 2002 • Vol. II • 163-171Tam
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Tamagawa Number Conjecture for zeta
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174 S. S. Kudlaseries with represen
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t.176 S. S. Kudlais the exponential
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178 S. S. Kudlawhere Z = J2ì n ìP
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180 S. S. Kudla(ii) T £ Sym 2 (Z)>
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182 S. S. KudlaTheorem 6. ([13], [9
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ICM 2002 • Vol. II • 185-195Ell
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Elliptic Curves and Class Field The
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198 E. UllmoSoit X une variété al
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200 E. UllmoThéorème 2.4 Soit X u
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202 E. UllmoQuestion 4.1 Soit x n =
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204 E. UllmoNotons que cet énoncé
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206 E. Ullmo[17] H. Oh. Uniform Poi
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208 T. D. WooleyWaring's problem as
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210 T. D. Wooleycircumstances one h
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212 T. D. Wooleywith 1 < z,w < F, M
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214 T. D. Wooleyand also byl f \K(a
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216 T. D. Wooleytions involving nor
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Section 4. Differential GeometryB.
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222 B. Andrewspotentially applicabl
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224 B. Andrewssurface can look metr
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226 B. Andrewsboundary of the set {
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228 B. Andrewseach t > 0, to either
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230 B. AndrewsUSSR Izv. 20 (1983).[
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232 Robert Bartnikprovides an impor
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234 Robert BartnikTheorem 2 If (M,
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236 Robert BartnikThe horizon condi
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238 Robert BartnikTheorem 8 Suppose
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240 Robert BartnikPhysics, LNP 212.
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242 P. Biran2. Various intersection
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244 P. BiranTheorem E'. Let (M,oj)
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246 P. Biransymplectic packings in
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248 P. Birangroup of Hamiltonian di
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250 P. Birannumber of steps it take
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252 P. Biranbe used to obtain many
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254 P. Biran[6] P. Biran, A stabili
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ICM 2002 • Vol. II • 257-271Bla
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Black Holes and the Penrose Inequal
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[23;[24;[25;[26;[27[28;[29'[30^Blac
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274 Xiuxiong ChenFor simplicity, in
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276 Xiuxiong ChenTheorem 0.1. [14]
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278 Xiuxiong ChenQuestion 0.6. (Don
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280 Xiuxiong Chencurvature in S 2 c
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282 Xiuxiong Chen[12] X. X. Chen an
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284 Weiyue DingSehrödinger flows a
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286 Weiyue DingIn order to prove Th
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288 Weiyue DingFor the first term i
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290 Weiyue Dingwhich satisfies the
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ICM 2002 • Vol. II • 293^302Dif
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Differential Geometry via Harmonic
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then eitherorDifferential Geometry
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ICM 2002 • Vol. II • 303-313Ind
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Index Iteration Theory for Symplect
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316 Anton PetruninTheorem A. Given
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318 Anton PetruninRiemannian manifo
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320 Anton Petruninspace. In the cas
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ICM 2002 • Vol. II • 323-338Col
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Collapsed Riemannian Manifolds with
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ICM 2002 • Vol. II • 339-349Com
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Complex Hyperbolic Triangle Groups
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352 Paul Seideldeformation spaces.
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354 Paul Seidelforgetting all the p
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356 Paul SeidelTheorem 3. Si,...,S
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358 Paul Seidelwhich must be of ord
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360 Paul Seidel[10] E. Getzler, Bat
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362 Weiping Zhang(iii) The heat ker
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364 Weiping Zhang3. The index theor
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366 Weiping Zhangwhere ch(g) is the
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- T p ( P d M , > 0 , 9 P d M , > 0
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Section 5. TopologyMladen Bestvina:
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374 Mladen Bestvinaof Out(F n ) coc
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376 Mladen Bestvina3. Culler-Vogtma
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378 Mladen BestvinaDefinition 8. A
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380 Mladen Bestvinaand then gluing
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382 Mladen BestvinaAnal. 10 (2000),
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384 Mladen Bestvina63 John R. Stall
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386 Yu. V. Chekanovplu I,Figure 1:
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388 Yu. V. Chekanovwithout loss of
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390 Yu. V. ChekanovFigure 2: Lagran
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392 Yu. V. ChekanovFigure 5: Local
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394 Yu. V. Chekanovderived from the
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396 M. Furatadimensional vector spa
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398 M. FurataHowever in the Seiberg
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400 M. Furata6. Seiberg-Witten-Floe
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402 M. Furata[14] K. Fukaya & K. On
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ICM 2002 • Vol. II • 405-114Gé
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Géométrie de Contact 407- la sph
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Géométrie de Contact 4093) chaque
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412 E. Giroux- en tout point p où
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414 E. Giroux[EU] Y. ELIASHBERG, Cl
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416 L. Hesselholt1. Algebraic üC-t
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418 L. Hesselholt(i) a pro-log diff
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420 L. HesselholtThe canonical map
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422 L. Hesselholttogether with a mu
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424 L. Hesselholtwhere \'- GK —^
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ICM 2002 • Vol. II • 427-436Sym
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Symplectic Sums and Gromov-Witten I
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ICM 2002 • Vol. II • 437-146Kno
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Knots, von Neumann Signatures, and
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ICM 2002 • Vol. II • 447-156Str
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Strings and the Stable Cohomology o
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ICM 2002 • Vol. II • 457-168Non
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Non-zero Degree Maps between 3-Mani
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Section 6. Algebraic and Complex Ge
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472 Hélène Esnaultto ^klX)/k carr
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474 Hélène Esnaultf*c 2 (E, V) is
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476 Hélène EsnaultTheorem 3.1 ([5
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478 Hélène Esnaultno longer the c
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480 Hélène EsnaultQuestion 5.4. W
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ICM 2002 • Vol. II • 483-494Hil
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Hilbert Schemes of Points on Surfac
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and use this to define operatorsHil
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ICM 2002 • Vol. II • 495-502Vec
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Vector Bundles on a K3 Surface 497s
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Vector Bundles on a K3 Surface 499A
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Vector Bundles on a K3 Surface 501a
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ICM 2002 • Vol. II • 503-512Thr
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Three Questions in Gromov-Witten Th
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ICM 2002 • Vol. II • 513^524Upd
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Update on 3-folds 515in the hyperbo
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Update on 3-folds 517In many contex
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Update on 3-folds 5193.3. Explicit
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Update on 3-folds 521The modem view
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Update on 3-folds 523is entertainin
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ICM 2002 • Vol. II • 525-532Sur
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Sur les Algèbres Vertex Attachées
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ICM 2002 • Vol. II • 533-541Top
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Topology of Singular Algebraic Vari
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ICM 2002 • Vol. II • 545-554Har
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Harmonie Analysis on Real Reductive
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[BS3][BS4][Be]Harmonie Analysis on
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ICM 2002 • Vol. II • 555-570On
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On the Dynamical Yang-Baxter Equati
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ICM 2002 • Vol. II • 571-582Geo
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Geometrie Langlands Correspondence
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ICM 2002 • Vol. II • 583-597On
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On the Local Langlands Corresponden
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600 A. KlyachkoAmong commonly known
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602 A. KlyachkoBy Theorem 2.3 this
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604 A. Klyachkois stable iff for ev
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606 A. KlyachkoUnitary spectral pro
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608 A. Klyachkospectra. By Metha-Se
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610 A. KlyachkoAgain our experience
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612 A. Klyachko[9] G. Faltings, Mum
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ICAl 2002 • Vol. II • 615-627Br
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Branching Problems of Unitary Repre
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630 Vikram Bhagvandas AlehtaDefinit
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632 Vikram Bhagvandas Alehtais in t
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634 Vikram Bhagvandas AlehtaTheorem
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ICAl 2002 • Vol. II • 637^642Cl
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Clifford Algebras and the Duflo Iso
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Clifford Algebras and the Duflo Iso
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ICAl 2002 • Vol. II • 643^654Re
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Representations of Yangians 6451.2.
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Representations of Yangians 6478 9
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Representations of Yangians 6492. T
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Representations of Yangians 651irre
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Representations of Yangians 6532.4.
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ICAl 2002 • Vol. II • 655-666Au
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Automorphic L-functions and Functor
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ICAl 2002 • Vol. II • 667^677Mo
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Modular Representations 669(l.b.2)
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Modular Representations 671e) Any p
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Modular Representations 673conjugac
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Modular Representations 675A genera
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Modular Representations 677^-repres
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ICAl 2002 • Vol. II • 681-690Va
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Value Distribution and Potential Th
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ICAl 2002 • Vol. II • 691-700Th
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The Branch Set of a Quasiregular Al
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ICAl 2002 • Vol. II • 701-709Ha
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Harmonie Aleasure and "Locally Flat
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712 N. Lerner1. From Hans Lewy to N
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714 N. Lernergood cases in (1.5) (w
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716 N. Lerner2. Counting the loss o
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718 N. LernerSolvability with loss
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720 N. Lerner6] L.Hörmander, On th
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722 C. ThieleA basic point of singu
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724 C. ThieleFigure 1: "Cone"< en I
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726 C. Thieleis negative. If all of
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728 C. Thielealso in these degenera
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730 C. ThieleThus he needed good co
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732 C. Thiele[6] Gilbert J., Nahmod
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I p : — \ J ( Z i , . . . , Z m )
Page 708 and 709:
736 S. ZelditchTheorem 1 [2] The pa
Page 710 and 711:
738 S. Zelditchfor U C
Page 712 and 713:
740 S. Zelditch[Pi,Pj] = 0 and whos
Page 714 and 715:
742 S. Zelditch[11] V. F. Lazutkin,
Page 716 and 717:
744 Xiangyu Zhou+00 at the boundary
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746 Xiangyu Zhouconnected component
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748 Xiangyu ZhouWightman [32], Jost
Page 722 and 723:
750 Xiangyu ZhouBrief proof is as f
Page 724 and 725:
752 Xiangyu Zhou[11] Al. Jarnicki,
Page 726 and 727:
Section 9. Operator Algebras andFun
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758 Semyon Alesker0.1.1 Definition,
Page 730 and 731:
760 Semyon Alesker2. Translation in
Page 732 and 733:
762 Semyon Alesker2.3. Valuations i
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764 Semyon AleskerReferences[1] Ale
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766 P. Bianewith classical cumulant
Page 738 and 739:
768 P. BianeObserve thatr(ai ... a
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770 P. Biane4. Noncrossing cumulant
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772 P. Bianethis gives the order of
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774 P. Biane[20] R. Speicher, Combi
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776 D. Bischsubfactors has develope
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778 D. Bisch(for all k > 0), where
Page 750 and 751:
780 D. BischObserve that by constru
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782 D. BischIt should be evident th
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784 D. Bisch[4] D. Bisch, Bimodules
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ICAl 2002 • Vol. II • 787^794Fr
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Free Probability, Free Entropy and
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ICAl 2002 • Vol. II • 795^812Ba
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Banach KK-theory and the Baum-Conne
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ICAl 2002 • Vol. II • 813-822On
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On Some Inequalities for Gaussian A
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Author IndexAlesker, Semyon 757Andr
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International Congress of Mathematicians

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