Geometric interpretation for exact triangles consisting of projectively flat bundles on higher dimensional complex tori
Abstract: Let $(Xn, \check{X}n)$ be a mirror pair of an $n$-dimensional complex torus $Xn$ and its mirror partner $\check{X}n$. Then, a simple projectively flat bundle $E(L,\mathcal{L})\rightarrow Xn$ is constructed from each affine Lagrangian submanifold $L$ in $\check{X}n$ with a unitary local system $\mathcal{L} \rightarrow L$. In this paper, we first interpret these simple projectively flat bundles $E(L,\mathcal{L})$ in the language of factors of automorphy. Furthermore, we give a geometric interpretation for exact triangles consisting of three simple projectively flat bundles $E(L,\mathcal{L})$ and their shifts by focusing on the dimension of intersections of the corresponding affine Lagrangian submanifolds $L$. Finally, as an application of this geometric interpretation, we discuss whether such an exact triangle on $Xn$ ($n \geq 2$) is obtained as the pullback of an exact triangle on $X1$ by a suitable holomorphic projection $Xn \rightarrow X1$.
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