Geometric interpretation for exact triangles consisting of projectively flat bundles on higher dimensional complex tori

Abstract

Let (Xn, Xn) be a mirror pair of an n-dimensional complex torus Xn and its mirror partner Xn. Then, a simple projectively flat bundle E(L,L)→ Xn is constructed from each affine Lagrangian submanifold L in Xn with a unitary local system L → L. In this paper, we first interpret these simple projectively flat bundles E(L,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,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 ≥ 2) is obtained as the pullback of an exact triangle on X1 by a suitable holomorphic projection Xn → X1.