Rigidity and Realizability for Tropical Curves in Dimension 3
Abstract
We present an unobstructedness criterion for Lagrangian threefolds L⊂ XA using the H1(L)-class associated with the boundary of a pseudoholomorphic disk. As an application, let XA Q be a Lagrangian torus fibration whose base Q is a tropical abelian threefold. Given V⊂ Q a rigid tropical curve with a pair-of-pants decomposition, we prove that the Lagrangian lift LV⊂ XA is unobstructed. Provided that an appropriate homological mirror symmetry statement holds, this implies the existence of a realization YV in the mirror abelian threefold XB Q.
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