Given a decorated planar graph $(G,ω)$, where $G$ is a planar graph and $ω\in H^1(|\mathcal{Q}G|,\mathbb{Z})$ with $\mathcal{Q}G$ the directed medial graph of $G$, we call some angular functions $ω$-compatible and study two distinct but related directed graphs: $\mathcal{L}(G,ω)$, which is the directed graph of such functions, and $BMS(G,ω)$, the directed graph of BMS states which are some pairs of $ω$-compatible functions plus additional data. We give sufficient conditions for $\mathcal{L}(G,ω)$ to be a graded distributive lattice, recovering Kauffman's Clock Theorem when $G$ is a knot diagram. We also define a potential on $\mathcal{Q} G$ and associate a representation of the corresponding quiver with potential to every BMS state. Under suitable assumptions, this construction yields an isomorphism between $\mathcal{L}(G,ω)$ and the lattice of subrepresentations of a maximal representation, generalizing a result of Bazier-Matte--Schiffler.