Block 01 Statement
This entry defines the structural geometry by which admissible transitions are represented, evaluated, and navigated under Continuity Physics.
This geometry does not create authority.
It operates strictly within the constraints inherited from Genesis and Constitution.
Node Definition
A Node is a high-density, internally coherent state.
- Density reflects the quantity and consistency of verified elements.
- Nodes are stable reference states.
- Nodes do not imply motion; they define positions of coherence.
Edge Definition
An Edge is an admissible transition between two nodes.
- Edges exist only if all Constitutional invariants are satisfied.
- Edges are directional and ordered.
- Absence of an edge implies the transition is invalid.
Envelope Definition
An Envelope is the set of all nodes reachable without violating continuity.
- The envelope is emergent, not predefined.
- Envelope expansion requires validated transitions.
- States outside the envelope are non-admissible.
Return Vector Definition
A Return Vector is a guaranteed admissible path back to a prior node.
- Every admissible outward transition must preserve at least one return vector.
- Loss of return invalidates the transition.
- Return vectors are structural, not procedural.
Communications Matrix (Coms Matrix)
The Coms Matrix is the anchored reference frame used to evaluate coherence across transitions.
- It provides orientation across state changes.
- It prevents reference drift.
- It is inherited from Genesis and Constitution constraints.
Scope of Authority
This geometry governs:
- navigation modeling,
- envelope evaluation,
- return validation,
- density reasoning.
It may not override:
- MLP,
- Constitutional invariants,
- Genesis routing rules.
Immutability Clause
This Block 01 entry is immutable once posted.
Any extension must be introduced as a new Block 01 entry with a higher sequence number.
Closure
This entry establishes the structural geometry required for continuity-preserving navigation.
All subsequent proofs and testimonies rely on this geometry by sequence.
