abstract duality: opposite category,
To every complex 3-dimensional Calabi-Yau variety is associated a 2-dimensional sigma-model -superconformal field theory . There is at least for some CY a map which exchanges the Hodge numbers and such that is expected to be equivalent to .
This is called mirror symmetry. At least in some cases this can be understood as a special case of T-duality.
In this form mirror symmetry remains a conjecture, not the least because for the moment there is no complete construction of these SCFTs. But to every such one can associate two TCFTs, and , the A-model and the B-model. These supersymmetric field theories were obtained by Edward Witten using a “topological twist”. The topological A-model can be expressed in terms of symplectic geometry of a variety and the topological B-model can be expressed in terms of the algebraic geometry of a variety.
These topological theories are easier to understand and do retain a little bit of the information encoded in the full SCFTs. In terms of these the statement of mirror symmetry says that passing to mirror CYs exchanges the A-model with the -model and conversely:
By a version of the cobordism hypothesis-theorem, these TCFTs (see there) are encoded by A-∞ categories that are Calabi-Yau categories: the A-model by the Fukaya category of which can be understood as a stable (∞,1)-category representing the Lagrangean intersection theory on the underlying symplectic manifold; and the B-model by an enhancement of the derived category of coherent sheaves on .
In terms of this data, mirror symmetry is the assertion that these A-∞ categories are equivalent and simultaneously the same under exchange :
This categorical formulation was introduced by Maxim Kontsevich in 1994 under the name homological mirror symmetry. The equivalence of the categorical expression of mirror symmetry to the SCFT formulation has been proven by Maxim Kontsevich and independently by Kevin Costello, who showed how the datum of a topological conformal field theory is equivalent to the datum of a Calabi-Yau A-∞-category(see TCFT).
The mirror symmetry conjecture roughly claims that every Calabi-Yau 3-fold has a mirror. In fact one considers (mirror symmetry for) degenerating families for Calabi-Yau 3-folds in large volume limit (what can be expressed precisely via the Gromov-Hausdorff metric). The appropriate definition of (an appropriate version of) the Fukaya category of a symplectic manifold is difficult to achieve in desired generality. Invariants/tools of Fukaya category include symplectic Floer homology and Gromov-Witten invariants (building up the quantum cohomology). Mirror symmetry is related to the T-duality on each fiber of an associated Lagrangian fibration (Strominger-Yau-Zaslow conjecture).
Although the non-Calabi-Yau case may be of lesser interest to physics, one can still formulate some mirror symmetry statements for, for instance, Fano manifolds. The mirror to a Fano manifold is a Landau-Ginzburg model (see Hori-Vafa; see also work of Auroux for an explanation via the Strominger-Yau-Zaslow T-duality philosophy). Then the statements are: the A-model of the Fano (given by the Fukaya category) is equivalent to the B-model of the Landau-Ginzburg model (given by the category of matrix factorizations); and the B-model of the Fano (given by the derived category of sheaves) is equivalent to the A-model of the Landau-Ginzburg model (given by the Fukaya-Seidel category). A few of the relevant names: Kontsevich, Hori-Vafa, Auroux, Katzarkov, Orlov, Seidel,
The original statement of the homological mirror symmetry conjecture is in
A review and status report is in
Other reviews include
Dirichlet branes and mirror symmetry,
Clay Mathematics Monogrph Volume 4, Amer. Math. Soc. Clay Math. Institute 2009
(pdf) (very readable!)
The relation to T-duality was established in
Further references include
C. Vafa, S-T. Yau editors, Winter school on mirror symmetry, vector bundles, and Lagrangian submanifolds, Harvard 1999, AMS, Intern. Press (includes A. Strominger, S-T. Yau, E. Zaslow, Mirror symmetry is -duality as pages 333–347; ).
K. Hori, S. Katz, A. Klemm et al. Mirror symmetry I, AMS, Clay Math. Institute 2003.
Paul Seidel, Fukaya categories and Picard-Lefschetz theory, Zurich Lectures in Advanced Mathematics. European Mathematical Society, Zürich, 2008. viii+326 pp
Mark Gross, Bernd Siebert, Mirror symmetry via logarithmic degeneration data I, math.AG/0309070, From real affine geometry to complex geometry, math.AG/0703822, Mirror symmetry via logarithmic degeneration data II, arxiv/0709.2290
A. N. Kapustin, D. O. Orlov, Lectures on mirror symmetry, derived categories, and D-branes, Uspehi Mat. Nauk 59 (2004), no. 5(359), 101–134; translation in Russian Math. Surveys 59 (2004), no. 5, 907–940, math.AG/0308173
Maxim Kontsevich, Yan Soibelman, Homological mirror symmetry and torus fibrations, math.SG/0011041
Yong-Geun Oh, Kenji Fukaya, Floer homology in symplectic geometry and mirror symmetry, Proc. ICM 2006, pdf
Here is a list with references that give complete proofs of homological mirror symmetry on certain (types of) spaces.
M. Abouzaid, I. Smith, Homological mirror symmetry for the four-torus, Duke Math. J. 152 (2010), 373–440, arXiv:0903.3065
A. Polishchuk and E. Zaslow, Categorical mirror symmetry: the elliptic curve, Adv. Theor. Math. Phys. 2:443470, 1998.
V. Golyshev, V. Lunts, D. Orlov, Mirror symmetry for abelian varieties, J. Alg. Geom. 10 (2001), no. 3, 433–496, math.AG/9812003
P. Seidel, Homological mirror symmetry for the quartic surface, arXiv:0310414
Alexander I. Efimov, Homological mirror symmetry for curves of higher genus, Inventiones Math. 166 (2006), 537–582, arXiv:0907.3903
D. Auroux, L. Katzarkov, D. Orlov, Mirror symmetry for Del Pezzo surfaces: Vanishing cycles and coherent sheaves, ; Mirror symmetry for weighted projective planes and their noncommutative deformations, Ann. Math. 167 (2008), 867–943, math.AG/0404281