Matrix Factorizations and Homological Mirror Symmetry on the Torus

A. Kapustin; A. Kapustin; A. Kapustin; A. Polishchuk; A. Polishchuk; A. Polishchuk; A. Polishchuk; A. Recknagel; C. Schmidt-Colinet; C.I. Lazaroiu; D. Mumford; D. Orlov; D. Orlov; E. Dell'Aquila; H. Enger; H. Jockers; H. M. Farkas; Harun Omer; I. Brunner; I. Brunner; I. Brunner; I. Brunner; J. Knapp; Johanna Knapp; K. Hori; K. Hori; L.E. Ibáñez; M. Herbst; M. Herbst; M. Herbst; P.S. Aspinwall; S. Govindarajan; S.K. Ashok

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Matrix Factorizations and Homological Mirror Symmetry on the Torus

Authors: A. Kapustin
A. Kapustin
A. Kapustin
A. Polishchuk
A. Polishchuk
A. Polishchuk
A. Polishchuk
A. Recknagel
C. Schmidt-Colinet
C.I. Lazaroiu
D. Mumford
D. Orlov
D. Orlov
E. Dell'Aquila
H. Enger
H. Jockers
H. M. Farkas
Harun Omer
I. Brunner
I. Brunner
I. Brunner
I. Brunner
J. Knapp
Johanna Knapp
K. Hori
K. Hori
L.E. Ibáñez
M. Herbst
M. Herbst
M. Herbst
P.S. Aspinwall
S. Govindarajan
S.K. Ashok
Publication date: 1 January 2007
Publisher: 'IOP Publishing'
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Abstract

We consider matrix factorizations and homological mirror symmetry on the torus T^2 using a Landau-Ginzburg description. We identify the basic matrix factorizations of the Landau-Ginzburg superpotential and compute the full spectrum, taking into account the explicit dependence on bulk and boundary moduli. We verify homological mirror symmetry by comparing three-point functions in the A-model and the B-model.Comment: 41 pages, 9 figures, v2: reference added, minor corrections and clarifications, version published in JHE

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