In 2005, Robert Lipshitz reformulated Heegaard Floer in a "cylindrical setting" by counting holomorphic curves in $\Sigma \times [0,1] \times \mathbb{R}$ where $\Sigma$ is a Heegaard surface for a Heegaard Diagram associated to a three manifold, $Y$. This is contrasted with Ozsvath and Szabo's original count in $\text{Sym}^g(\Sigma)$. One main advantage of this setting is that $\Sigma \times [0,1] \times \mathbb{R}$ is quite easy to draw and visualize, whereas $\text{Sym}^g(\Sigma)$ is not.
My question is as follows: how do we actually compute this? In Figure 1 of the linked paper, Lipshitz draws what a holomorphic curve might look like, but this is for a Heegaard surface with only one intersection point. Are there examples explicitly computed out there? I am having trouble determining how they should look in general and how we can easily tell when there is a curve connecting two intersection points. In the original formulation of HF, counting holomorphic disks was very straight forward, if annoying in higher genus, so I expect this to not be too complex either.
