Contributions Ã l'Etude du Vertex Topologique en ThÃ©orie ... - Toubkal

More documents

Recommendations

Info

BIBLIOGRAPHIE[72] Yukiko Konishi, Satoshi Minabe, Flop invariance of the topological vertex,arXiv :math/0601352.[73] N. Saulina, C. Vafa, D-branes as defects in the Calabi-Yau crystal, hep-th/0404246.[74] T. Okuda, Derivation of Calabi-Yau Crystals from Chern-Simons Gauge theory,JHEP 0503 (2005) 047 hep-th/0409270.[75] N. Halmagyi, A. Sinkovics, P. Sułkowski, Knot invariants and Calabi-Yau crystals,JHEP 0601 (2006) 040, hep-th/0506230.[76] Takuya Okuda, BIons in topological string theory, Journal-ref : JHEP0801 :062,2008,arXiv :0705.0722.[77] Dominic Joyce, Lectures on Calabi-Yau and special Lagrangian geometry,arXiv :math/0108088.[78] Riccardo Ricci, Super Calabi-Yau’s and Special Lagrangians, JHEP 0703 (2007) 048,arXiv :hep-th/0511284.[79] N. A. Nekrasov, Seiberg-Witten prepotential from instanton counting, Adv. Theor.Math. Phys. 7, 831 (2004), arXiv :hep-th/0206161.[80] A. Iqbal and A. K. Kashani-Poor, Instanton counting and Chern-Simons theory,Adv. Theor.Math. Phys. 7, 457 (2004), arXiv :hep-th/0212279, SU(N) geometriesand topological string amplitudes, Adv. Theor. Math. Phys. 10, 1 (2006), arXiv :hepth/0306032.[81] T. Eguchi and H. Kanno, Topological strings and Nekrasov’s formulas, JHEP 0312,006 (2003), arXiv :hep-th/0310235.[82] Pan Peng, A simple proof of Gopakumar-Vafa conjecture for local toric Calabi-Yaumanifolds arXiv :math.AG/0410540.[83] J. Bryan and R. Pandharipande, The local Gromov-Witten theory of curves,arXiv :math/0411037.[84] D. Maulik, N. Nekrasov, A. Okounkov, R. Pandharipande, Gromov-Witten theoryand Donaldson-Thomas theory, I-II, math.AG/0312059, math.AG/0406092.[85] C. Faber, R. Pandharipande, Hodge integrals and Gromov-Witten theory,math.AG/9810173.[86] T. Graber and E. Zaslow, Open string Gromov-Witten invariants : Calculations anda mirror ’theorem’, arXiv :hep-th/0109075.276
BIBLIOGRAPHIE[87] Yukiko Konishi, Integrality of Gopakumar-Vafa invariants of toric Calabi–Yau threefolds,Publ. RIMS, Kyoto Univ. 42 (2006), 605–648.[88] A. Iqbal, A-K Kashani-Poor, Instanton Counting and Chern-Simons Theory, Adv.Theor. Math. Phys. 7 (2004) 457-497, hep-th/0212279.[89] R. Gopakumar, C. Vafa, M-Theory and Topological Strings–I, hep-th/9809187, R.Gopakumar, C. Vafa, M-Theory and Topological Strings–II, hep-th/9812127.[90] T. Hollowood, A. Iqbal, C. Vafa, Matrix models, geometric engineering and ellipticgenera, hep-th/0310272.[91] Andrei Okounkov, Nikolai Reshetikhin, Cumrun Vafa, Quantum Calabi-Yau andClassical Crystals, arXiv :hep-th/0309208.[92] P. McMahon, Combinatory analysis I, II, Cambridge University Press, 1915-1916,reprinted by Chelsea, New York, 1960.[93] Lalla Btissam Drissi, Houda Jehjouh, El Hassan Saidi, Generalized MacMahon G(q)as q-deformed CFT Correlation Function, arXiv :0801.2661, Nuclear Physics B 801(2008) 316–345.[94] J. Heckman, C. Vafa, Crystal Melting and Black Holes, hep-th/0610005.[95] P. Candelas, “Lectures on Complex Geometry” in Trieste 1987, Proceedings, Superstrings’87. 1987.[96] Vincent Bouchard, Lectures on complex geometry, Calabi–Yau manifolds and toricgeometry, arXiv :hep-th/0702063v1.[97] B. R. Greene, “String theory on Calabi-Yau manifolds,” hep-th/9702155.[98] S.-T. Yau, “On Calabi’s conjecture and some new results in algebraic geometry,”Proceedings of the National Academy of Sciences of the U.S.A. 74 (1977) 1798–1799.S.-T. Yau, “On the Ricci curvature of a compact Kahler manifold and the complexMonge-Ampère equations. I.,” Communications on pure and applied mathematics 31(1978) 339–411.[99] K. Hori and C. Vafa, Mirror symmetry, hep-th/0002222.[100] M. Aganagic, C. Vafa, Mirror symmetry, D-branes and counting holomorphic discs,hep-th/0012041.[101] M. Aganagic and C. Vafa, Mirror Symmetry, D-Branes and Counting HolomorphicDiscs, arXiv :hep-th/0012041.277
Page 1 and 2:
UNIVERSITÉ MOHAMMED V - AGDALFACUL
Page 3 and 4:
TABLE DES MATIÈRES3.3 Invariants t
Page 5 and 6:
TABLE DES MATIÈRES8.2 Fonctions de
Page 7 and 8:
Avant ProposCe travail à été eff
Page 9 and 10:
Lab/UFR PHEUne thèse représente u
Page 11 and 12:
10Lab/UFR PHE
Page 13 and 14:
Contributions à l’Etude du Verte
Page 15 and 16:
Page 17 and 18:
Page 19 and 20:
Page 21 and 22:
Page 23 and 24:
Page 25 and 26:
2.1 Généralités sur les variét
Page 27 and 28:
Page 29 and 30:
Page 31 and 32:
2.2 Conifoldavec (y 1 , y 2 ) ≠ (
Page 33 and 34:
2.2 Conifoldoù µ est un nombre co
Page 35 and 36:
2.3 Variétés de CY toriquesFig. 2
Page 37 and 38:
2.3 Variétés de CY toriquesEn gé
Page 39 and 40:
2.3 Variétés de CY toriquessur L
Page 41 and 42:
2.3 Variétés de CY toriquesz3z1z2
Page 43 and 44:
2.3 Variétés de CY toriquesFig. 2
Page 45 and 46:
du vertex U 3r α = |z 1 | 2 − |z
Page 47 and 48:
Page 49 and 50:
3.1 Théorie des cordes topologique
Page 51 and 52:
Page 53 and 54:
Page 55 and 56:
Page 57 and 58:
Page 59 and 60:
Page 61 and 62:
3.2 Dualité corde ouverte / corde
Page 63 and 64:
3.3 Invariants topologiquesNotons a
Page 65 and 66:
3.3 Invariants topologiquesoù F es
Page 67 and 68:
3.3 Invariants topologiquesDans le
Page 69 and 70:
3.3 Invariants topologiquesL’acti
Page 71 and 72:
3.4 Modèle B et espace twistorielI
Page 73 and 74:
H. Jehjouhprojectif complexe -PT d
Page 75 and 76:
¢¡¤£¦¥¨§©£¦©¡©¤ !©"
Page 77 and 78:
¢ Ï ¢ £ ‡Vß £¢+Ï¢ »~
Page 79 and 80:
;_q¢¨œžŸ•£-d ŸšX¡£¢5¤
Page 81 and 82:
"©‹%&$}¦|`kÏÕÿ [‘{¤Š+|Ç
Page 83 and 84:
wÜÛ ¼¢~ x wÖÛ ¼Œ x ‘|16 |
Page 85 and 86:
Ýqáq~ ‡'‡*…{‚©Ë Š4Œ
Page 87 and 88:
œFF)©ÞFFœGFF+¢ÞFF‚ò ~ â
Page 89 and 90:
ò ~ âbaâ`~âbá Iò ~ €ò ~ â
Page 91 and 92:
†â ÏË‡45*H©|½ß(}e*…{¤
Page 93 and 94:
Î/ ¥¨w ¢yx ¥H´³:Mb:óGÏ³
Page 95 and 96:
,n£¢R|1"…}¤|Z‹‡ ¦b¥G/¢
Page 97 and 98:
GÏÕÛ Þ ³] Þ IA{ ‡'ß ì=Ï
Page 99 and 100:
¢¢,ø ùù¢¢¢¨¢ùù¢¢ ³r
Page 101 and 102:
" GG+-, Ú/. 0+-, Ú1. 0G¢$Þã«G
Page 103 and 104:
¢GÓ6¢@?¢‡©>6'&½‹-, ‡'
Page 105 and 106:
,¢¢ Œ ¢ H}MBÏ 7¢¦, Ú1. 0‡
Page 107 and 108:
——ý5g>ÊSØsÏ+È8ÄÀ8ÎÅ
Page 109 and 110:
4.1 Variétés de CY toriques et cr
Page 111 and 112:
Page 113 and 114:
Page 115 and 116:
Cela a fait apparaître d’autres
Page 117 and 118:
4.2 Fonction de partition perpendic
Page 119 and 120:
4.3 Version raffinée de la fonctio
Page 121 and 122:
4.3 Version raffinée de la fonctio
Page 123 and 124:
4.4 Modèle du cristal fondu et con
Page 125 and 126:
4.4 Modèle du cristal fondu et con
Page 127 and 128:
4.5 Invariants topologiques dans le
Page 129 and 130:
4.6 Contribution : Generalized MacM
Page 131 and 132:
L.B. Drissi et al. / Nuclear Physic
Page 133 and 134:
Page 135 and 136:
(Γ + (z) = exp −i ∑ )1n z−n
Page 137 and 138:
Page 139 and 140:
Page 141 and 142:
Page 143 and 144:
Page 145 and 146:
(∏ ∞(Υ − (q) = Ω − qk ))k
Page 147 and 148:
Page 149 and 150:
Page 151 and 152:
Page 153 and 154:
Page 155 and 156:
Page 157 and 158:
Page 159 and 160:
Page 161 and 162:
5.1 Formalisme du Vertex topologiqu
Page 163 and 164:
Page 165 and 166:
Page 167 and 168:
Page 169 and 170:
Page 171 and 172:
Page 173 and 174:
Page 175 and 176:
5.3 Vertex Topologique et Théorie
Page 177 and 178:
H. JehjouhL’amplitude des produit
Page 179 and 180:
176H. Jehjouh
Page 181 and 182:
308 L.B. Drissi et al. / Nuclear Ph
Page 183 and 184:
Page 185 and 186:
Page 187 and 188:
Page 189 and 190:
Page 191 and 192:
Page 193 and 194:
Page 195 and 196:
Page 197 and 198:
Page 199 and 200:
Page 201 and 202:
Page 203 and 204:
Page 205 and 206:
Page 207 and 208:
Page 209 and 210:
Page 211 and 212:
Page 213 and 214:
Page 215 and 216:
Chapitre 6Vertex Topologique Raffin
Page 217 and 218:
5.1 Raffinement du vertex topologiq
Page 219 and 220:
5.2 Fonctions de partitions du vert
Page 221:
5.2 Fonctions de partitions du vert
Page 225 and 226:
5.4 Vertex raffiné et homologie de
Page 227 and 228:
Page 229 and 230:
Page 231 and 232: 226H. Jehjouh
Page 233 and 234: 013509-2 Drissi, Jehjouh, and Saidi
Page 241 and 242: 013509-10 Drissi, Jehjouh, and Said
Page 243 and 244: 013509-12 Drissi, Jehjouh, and Said
Page 245 and 246: Conclusion et perspectivesde ce doc
Page 247 and 248: Fonctions de Schur et MacMahontopol
Page 249 and 250: Chapitre 8Annexe : Fonctions de Sch
Page 251 and 252: Fonctions de Schur et MacMahonFig.
Page 253 and 254: Fonctions de Schur et MacMahondimen
Page 255 and 256: Fonctions de Schur et MacMahonstric
Page 263 and 264: Fonctions de Schur et MacMahonPropo
Page 265 and 266: Fonctions de Schur et MacMahonOn pe
Page 267 and 268: Fonctions de Schur et MacMahona) Bo
Page 269 and 270: Fonctions de Schur et MacMahonLe mo
Page 271 and 272: Fonctions de Schur et MacMahonavec
Page 273 and 274: Fonctions de Schur et MacMahonla ma
Page 275 and 276: Fonctions de Schur et MacMahonayant
Page 277 and 278: Bibliographie[1] J. Polchinski, Str
Page 279 and 280: BIBLIOGRAPHIE[27] A.A. Belavin, A.
Page 281: BIBLIOGRAPHIE[57] A. Braverman and
Page 285 and 286: BIBLIOGRAPHIE[119] D. A. Cox, The H
Page 287 and 288: BIBLIOGRAPHIE[150] C. Weiss and M.
Page 289 and 290: BIBLIOGRAPHIE[180] H. Awata and H.
Page 291: UNIVERSITÉ MOHAMMED V - AGDALFACUL
show all

Contributions Ã l'Etude du Vertex Topologique en ThÃ©orie ... - Toubkal

Create successful ePaper yourself

Delete template?

Save as template?