On a noncommutative deformation of holomorphic line bundles on complex tori and the SYZ transform

Abstract

By regarding a given n-dimensional complex torus Xn as the trivial torus fibration Xn Rn/Zn, we can obtain a mirror dual complexified symplectic torus Xn based on the SYZ construction. In the middle 2000s, as a part of the study on noncommutative deformations of Xn, Kajiura examined the noncommutative complex torus Xθn obtained via the (real) nonformal deformation quantization of Xn Rn/Zn by a Poisson bivector θ defined along the fibers. In particular, he constructed the noncommutative deformations Lθ Xθn of holomorphic line bundles on Xn and a curved dg-category consisting of them. On the other hand, associated to this noncommutative deformation, we can construct a non-trivial deformation of the trivial holomorphic line bundle on Xn by twisting it with a suitable isomorphism. In this paper, from this point of view, we extend the construction of Lθ to the more general setting. Moreover, we also consider objects defined on a mirror partner of Xθn which are mirror dual to such extended noncommutative objects.

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