• Grading
• Orientation
• Index

Let $\Sigma$ be a Liouville domain, with $\hat \Sigma$ be its Liouville completion. Let $D = [0,1] \times \R$, be the base disk with two punctures. Let $\hat X = \hat \Sigma \times D$. Let $s \in \R$ and $t \in [0,1]$, so $t$ is the Reeb parameter, and $s$ is the gradient flow parameter.

We consider two sets of disjoint exact Lagrangians in $\hat \Sigma$, $\alpha$ and $\alpha'$, conical in the ends.

We choose almost complex structure to the same as the exact one, only perturbing in the interior.