Seidel elements and mirror transformations

@article{Gonzalez2011SeidelEA,
  title={Seidel elements and mirror transformations},
  author={Eduardo Gonzalez and Hiroshi Iritani},
  journal={Selecta Mathematica},
  year={2011},
  volume={18},
  pages={557-590}
}
The goal of this article is to give a precise relation between the mirror symmetry transformation of Givental and the Seidel elements for a smooth projective toric variety X with −KX nef. We show that the Seidel elements entirely determine the mirror transformation and mirror coordinates. 
View on Springer
arxiv.org
18 Citations
Highly Influential Citations
2
Background Citations
3
Methods Citations
3
Results Citations
2

18 Citations

Seidel elements and mirror transformations for toric stacks

We give a precise relation between the mirror transformation and the Seidel elements for weak Fano toric Deligne-Mumford stacks. Our result generalizes the corresponding result for toric varieties

Shift operators and toric mirror theorem

We give a new proof of Givental's mirror theorem for toric manifolds using shift operators of equivariant parameters. The proof is almost tautological: it gives an A-model construction of the

A mirror construction for the big equivariant quantum cohomology of toric manifolds

We identify a certain universal Landau–Ginzburg model as a mirror of the big equivariant quantum cohomology of a (not necessarily compact or semipositive) toric manifold. The mirror map and the

A mirror construction for the big equivariant quantum cohomology of toric manifolds

We identify a certain universal Landau–Ginzburg model as a mirror of the big equivariant quantum cohomology of a (not necessarily compact or semipositive) toric manifold. The mirror map and the

Noncontractible Hamiltonian loops in the kernel of Seidel’s representation

The main purpose of this note is to exhibit a Hamiltonian diffeomorphism loop undetected by the Seidel morphism of certain 2-point blow-ups of $S^2 \times S^2$, exactly one of which being monotone.

Open Gromov–Witten invariants and mirror maps for semi-Fano toric manifolds

We prove that for a compact toric manifold whose anti-canonical divisor is numerically effective, the Lagrangian Floer superpotential defined by Fukaya-Oh-Ohto-Ono is equal to the superpotential

Hodge-theoretic mirror symmetry for toric stacks

Using the mirror theorem [CCIT15], we give a Landau-Ginzburg mirror description for the big equivariant quantum cohomology of toric Deligne-Mumford stacks. More precisely, we prove that the big

A Note on Disk Counting in Toric Orbifolds

We compute orbi-disk invariants of compact Gorenstein semi-Fano toric orbifolds by extending the method used for toric Calabi-Yau orbifolds. As a consequence the orbi-disc potential is analytic over

Quantum Cohomology and Closed-String Mirror Symmetry for Toric Varieties

  • Jack Smith
  • Mathematics
    The Quarterly Journal of Mathematics
  • 2020
We give a short new computation of the quantum cohomology of an arbitrary smooth (semiprojective) toric variety $X$, by showing directly that the Kodaira–Spencer map of Fukaya–Oh–Ohta–Ono defines an

Quantum cohomology and toric minimal model programs

References

SHOWING 1-10 OF 22 REFERENCES

A mirror theorem for toric complete intersections

We prove a generalized mirror conjecture for non-negative complete intersections in symplectic toric manifolds. Namely, we express solutions of the PDE system describing quantum cohomology of such a

Hori-Vafa mirror models for complete intersections in weighted projective spaces and weak Landau-Ginzburg models

We prove that Hori-Vafa mirror models for smooth Fano complete intersections in weighted projective spaces admit an interpretation as Laurent polynomials.

Mirror symmetry and algebraic geometry

Introduction The quintic threefold Toric geometry Mirror symmetry constructions Hodge theory and Yukawa couplings Moduli spaces Gromov-Witten invariants Quantum cohomology Localization Quantum

Comparison of the algebraic and the symplectic Gromov-Witten invariants

We show that the algebraic and the symplectic GW-inivariants of smooth projective varieties are equivalent.

Quantum cohomology and $S^1$-actions with isolated fixed points

This paper studies symplectic manifolds that admit semi-free circle actions with isolated fixed points. We prove, using results on the Seidel element, that the (small) quantum cohomology of a

Moment Maps and Combinatorial Invariants of Hamiltonian Tn-spaces

Basic definitions and examples the Duistermaat-Heckman theorem multiplicities as invariants of reduced spaces partition functions. Appendix I: Toric varieties. Appendix 2: Kaehler structures on toric

Quantum Homology of fibrations over $S^2$

This paper studies the (small) quantum homology and cohomology of fibrations p:P→S2 whose structural group is the group of Hamiltonian symplectomorphisms of the fiber (M, ω). It gives a proof that

Equivariant Chow cohomology of nonsimplicial toric varieties

For a toric variety X_P determined by a rational polyhedral fan P in a lattice N, Payne shows that the equivariant Chow cohomology of X_P is the Sym(N)--algebra C^0(P) of integral piecewise

J-Holomorphic Curves and Symplectic Topology

The theory of $J$-holomorphic curves has been of great importance since its introduction by Gromov in 1985. In mathematics, its applications include many key results in symplectic topology. It was

TORIC VARIETIES

We study toric varieties over a field k that split in a Galois extension K/k using Galois cohomology with coefficients in the toric automorphism group. This Galois cohomology fits into an exact