Symmetry, Integrability and Geometry: Methods and Applications (SIGMA)

Special Issue on Mirror Symmetry and Related Topics

The Guest Editors for this special issue are

Denis Auroux (University of California, Berkeley, USA)
Victor Batyrev (Universität Tübingen, Germany)
Alexander Polishchuk (University of Oregon, USA)
Eric Zaslow (Northwestern University, USA)

Topics for this special issue include mirror symmetry in its various formulations, and its connections to algebraic geometry, symplectic geometry, and other fields of mathematics and mathematical physics.

The issue contains 9 papers with the total of 869 pages.

We would like to thank all the authors who have published papers in the issue, and to give our special thanks to all the referees for providing constructive reviews.

The Guest Editors        

Papers in this Issue:

Fukaya Categories as Categorical Morse Homology
David Nadler
SIGMA 10 (2014), 018, 47 pages   [ abs   pdf ]
Upper Bounds for Mutations of Potentials
John Alexander Cruz Morales and Sergey Galkin
SIGMA 9 (2013), 005, 13 pages   [ abs   pdf ]
Renormalization Method and Mirror Symmetry
Si Li
SIGMA 8 (2012), 101, 17 pages   [ abs   pdf ]
Minkowski Polynomials and Mutations
Mohammad Akhtar, Tom Coates, Sergey Galkin and Alexander M. Kasprzyk
SIGMA 8 (2012), 094, 707 pages   [ abs   pdf ]
Nekrasov's Partition Function and Refined Donaldson-Thomas Theory: the Rank One Case
Balázs Szendrői
SIGMA 8 (2012), 088, 16 pages   [ abs   pdf ]
Recent Developments in (0,2) Mirror Symmetry
Ilarion Melnikov, Savdeep Sethi and Eric Sharpe
SIGMA 8 (2012), 068, 28 pages   [ abs   pdf ]
Monodromy of an Inhomogeneous Picard-Fuchs Equation
Guillaume Laporte and Johannes Walcher
SIGMA 8 (2012), 056, 10 pages   [ abs   pdf ]
Examples of Matrix Factorizations from SYZ
Cheol-Hyun Cho, Hansol Hong and Sangwook Lee
SIGMA 8 (2012), 053, 24 pages   [ abs   pdf ]
Mutations of Laurent Polynomials and Flat Families with Toric Fibers
Nathan Owen Ilten
SIGMA 8 (2012), 047,  7 pages   [ abs   pdf ]

The poster of the issue is available in A4 format and A3 format.

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