preface
part i. riemannian holonomy groups and calibrated geometry
dominic joyce
1 introduction
2 introduction to holonomy groups
3 berger's classification of holonomy groups
4 kahler geometry and holonomy
5 the calabi conjecture
6 the exceptional holonomy groups
7 introduction to calibrated geometry
8 calibrated submanifolds in rn
9 constructions of sl m-folds in ctm
10 compact calibrated submanifolds
11 singularities of special lagrangian m-folds
12 the syz conjecture, and sl fibrations
part ii. calabi-yau manifolds and mirror symmetry
mark gross
13 introduction
14 the classical geometry of calabi-yau manifolds
.15 kahler moduli and gromov-witten invariants
16 variation and degeneration of hodge structures
17 a mirror conjecture
18 mirror symmetry in practice
19 the strominger-yau-zaslow approach to mirror symmetry
part iii. compact hyperkaihler manifolds
daniel huybrechts
20 introduction
21 holomorphic symplectlc manifolds
22 deformations of complex structures
23 the beauville-bogomolov form
24 cohomology of compact hyperkahler manifolds
25 twistor space and moduli space
26 projectivity of hyperkahler manifolds
27 birational hyperkahler manifolds
28 the (birational) kahler cone
references
index
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