The laws of relational dynamics are cross-structural constraints that govern relationships between distinct relational structures. Each law is earned through the derivation — none is assumed. They are distinguished from defining properties of specific operators (such as the idempotence of closure or the self-limiting character of flow), which belong to those operators’ own pages.
- Dual motions do not interfere — consolidating and releasing can be performed in either order without distorting the structure (Movement II)
- Flow preserves the modal core — directed motion respects the boundaries of necessity and possibility (Movement III)
- Assembly and analysis commute under coherence — building up from parts and breaking down from the whole produce the same result when relational coherence is complete (Movement IV)
- Every symmetry yields an invariant — every consistency in the relational logic finds expression as a measurable conserved quantity (Movement V)