What does this research mean for the field?

Local Tamari rotations of Ω-trees do not significantly alter the average containment depth μ, as evidenced by the recorded changes Δμ. Novelty: ClaimNovelty.INCREMENTAL. Consensus alignment: ConsensusAlignment.NEUTRAL.

What question did this study set out to answer?

To explore the effects of local Tamari rotations on the average containment depth within the Ω Relational Geometry framework.

March 7, 2026Open Access

Ω Relational Geometry — Addendum A: Local Structural Perturbations of Nested Relations

Key Points

To explore the effects of local Tamari rotations on the average containment depth within the Ω Relational Geometry framework.
Enumerated all ordered Ω-trees for n = 6–8 leaves.
Applied single Tamari right-rotations to each Ω-tree.
Recorded changes in the invariant μ after rotations.
Visualized the distribution of changes in μ under local perturbations.
Determined the fraction of rotations that preserve the invariant μ.
Mapped the scalar field of μ across the associahedron adjacency graph.

Abstract

This note presents a small structural observation extending the Ω Relational Geometry framework. The experiment examines how the invariant μ (average containment depth) behaves under local Tamari rotations of Ω-trees representing nested relational containment. All ordered Ω-trees for n = 6–8 leaves were enumerated and each single Tamari right-rotation was applied. The resulting change Δμ = μ(T′) − μ(T) was recorded. Figures included in this note visualise: • the distribution of Δμ under local structural perturbations • the fraction of rotations that preserve μ • the scalar field of μ across the associahedron adjacency graph The purpose of this note is purely structural. No interpretive claims are made. It accompanies the original Ω Relational Geometry paper which defines the nested relational framework and invariant μ.

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