Cross-Domain Edges

The τ-framework’s three glossary domains (physics, life, metaphysics) are not independent silos. Every empirical observation in physics has its life-sector amplification; every life-sector chirality bias has its categorical readout; every metaphysical commitment has its empirical anchor. Cross-domain edges are the explicit structural bridges between these.

This page surfaces every cross-domain related_glossary_entries link in the glossary as a navigable graph. The current count and edge list below regenerate automatically as glossary entries are extended.

Summary

How cross-domain edges work

Each glossary entry’s related_glossary_entries field can name terms from any of the three domains. When a Physics entry references a Life or Metaphysics term (or vice versa), that edge is a cross-domain bridge. The export pipeline counts and surfaces these:

exports/public/glossary/cross-domain-links.json:
{
  "edge_count": <total>,
  "edges": [{ "from": <id>, "from_domain": <d>, "to": <id>, "to_domain": <d> }, ...]
}

These edges are how the framework keeps its three domains coherent. When the K_χ channel (LG-Y02) explicitly references the neutron-mass anchor (PG-P01), it’s not metaphor — it’s a structural commitment that the chirality amplifier is anchored to physics.

Bridge categories

Physics ↔ Life

The most fundamental bridge. Every life-sector observable inherits its calibration from m_n via the K_χ chain. The pivots:

• PG-P01-neutron τ-Neutron → LG-Y02-kinetic-pseudoscalar-channel Kinetic Pseudoscalar Channel
• LG-Y02-kinetic-pseudoscalar-channel Kinetic Pseudoscalar Channel → PG-P01-neutron τ-Neutron

Physics ↔ Metaphysics

Metaphysics’s empirical register Reg_E reads physics observables; physics’s anchor m_n is the canonical Reg_E example.

• PG-P01-neutron τ-Neutron → MG-R01-empirical-register Empirical Register (Reg_E)
• MG-R01-empirical-register Empirical Register (Reg_E) → PG-P01-neutron τ-Neutron

Life ↔ Metaphysics

Where biology meets categorical architecture. Consciousness (LG-M01) bridges to the CI operator graph (MG-A01) and qualia (MG-H01); the K_χ channel feeds Reg_E.

• LG-M01-consciousness Consciousness → MG-A01-ci-operator-graph CI Operator Graph
• LG-M01-consciousness Consciousness → MG-H01-qualia Qualia (subsymbolic morphisms)
• LG-Y02-kinetic-pseudoscalar-channel Kinetic Pseudoscalar Channel → MG-R01-empirical-register Empirical Register (Reg_E)
• MG-A01-ci-operator-graph CI Operator Graph → LG-M01-consciousness Consciousness
• MG-H01-qualia Qualia (subsymbolic morphisms) → LG-M01-consciousness Consciousness
• MG-R01-empirical-register Empirical Register (Reg_E) → LG-Y02-kinetic-pseudoscalar-channel Kinetic Pseudoscalar Channel

All cross-domain edges

• PG-C05-fine-structure-alpha Fine-structure constant α → MathG-D01-iota-tau Master constant ι_τ
• PG-C05-fine-structure-alpha Fine-structure constant α → MathG-D02-tau-categorical τ-categorical structure
• PG-C05-fine-structure-alpha Fine-structure constant α → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-C05-fine-structure-alpha Fine-structure constant α → MathG-D08-five-generators-def Five Generators (definition)
• PG-C05-fine-structure-alpha Fine-structure constant α → MathG-K01-universe-postulate The Universe Postulate (K0)
• PG-C05-fine-structure-alpha Fine-structure constant α → MathG-K02-five-generators The five canonical generators (K1–K5)
• PG-C05-fine-structure-alpha Fine-structure constant α → MathG-K03-no-omega-axiom The no-ω axiom (K6)
• PG-C05-fine-structure-alpha Fine-structure constant α → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-C05-fine-structure-alpha Fine-structure constant α → MathG-O01-tau-object Generic τ-object
• PG-C06-elementary-charge Elementary charge e → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-C06-elementary-charge Elementary charge e → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-C14-gravitational-fine-structure Gravitational fine-structure constant α_G → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-C14-gravitational-fine-structure Gravitational fine-structure constant α_G → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-C16-weinberg-angle Weak mixing angle sin²θ_W → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-C16-weinberg-angle Weak mixing angle sin²θ_W → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-D01-iota-tau Master constant ι_τ
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-D03-window-algebra Window-algebra integers W_n(k)
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-D05-rank-coordinates Rank coordinates (n, k)
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-D06-truth4-logic Truth4 Logic
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-D09-calibrated-split-complex Calibrated Split-Complex Codomain
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-D10-split-complex-scalars Split-Complex Scalars
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-D11-stage-k-cylinder Stage-k Cylinder
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-D15-boundary-ring Boundary Ring and Scalars
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-D16-ultrametric-distance τ-Ultrametric Distance
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-O02-window-object Window-algebra object
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-S02-holomorphy-tower Book I holomorphy tower
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-T01-hyperfactorization Hyperfactorization theorem
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-T04-central-theorem Central theorem at rank (3, 15)
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-T06-prime-polarity Prime Polarity Theorem
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-T07-split-complex-forced Split-Complex Forced
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-T08-crt-coherence CRT Coherence Constraint
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-T09-algebraic-lemniscate Algebraic Lemniscate
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-T11-mutual-determination Mutual Determination (5-Way Equivalence)
• PG-C18-kappa-tau Gravity-sector coupling κ_τ → MathG-T13-spectral-trichotomy Spectral Trichotomy Lemma
• PG-L01-tau-schrodinger τ-Schrödinger Equation → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-L01-tau-schrodinger τ-Schrödinger Equation → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-L02-tau-heisenberg-uncertainty τ-Heisenberg Uncertainty → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-L02-tau-heisenberg-uncertainty τ-Heisenberg Uncertainty → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-D01-iota-tau Master constant ι_τ
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-D02-tau-categorical τ-categorical structure
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-D03-window-algebra Window-algebra integers W_n(k)
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-D05-rank-coordinates Rank coordinates (n, k)
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-D08-five-generators-def Five Generators (definition)
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-D11-stage-k-cylinder Stage-k Cylinder
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-D12-progression-operator Progression Operator ρ
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-K01-universe-postulate The Universe Postulate (K0)
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-K02-five-generators The five canonical generators (K1–K5)
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-K03-no-omega-axiom The no-ω axiom (K6)
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-O01-tau-object Generic τ-object
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-O02-window-object Window-algebra object
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-S02-holomorphy-tower Book I holomorphy tower
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-T01-hyperfactorization Hyperfactorization theorem
• PG-L04-tau-einstein-equation τ-Einstein Equation → MathG-T06-prime-polarity Prime Polarity Theorem
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-D01-iota-tau Master constant ι_τ
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-D05-rank-coordinates Rank coordinates (n, k)
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-D06-truth4-logic Truth4 Logic
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-D09-calibrated-split-complex Calibrated Split-Complex Codomain
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-D10-split-complex-scalars Split-Complex Scalars
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-D15-boundary-ring Boundary Ring and Scalars
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-D16-ultrametric-distance τ-Ultrametric Distance
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-T01-hyperfactorization Hyperfactorization theorem
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-T04-central-theorem Central theorem at rank (3, 15)
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-T06-prime-polarity Prime Polarity Theorem
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-T07-split-complex-forced Split-Complex Forced
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-T08-crt-coherence CRT Coherence Constraint
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-T09-algebraic-lemniscate Algebraic Lemniscate
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-T11-mutual-determination Mutual Determination (5-Way Equivalence)
• PG-L05-tau-newton-gravity τ-Newton's Law of Gravity → MathG-T13-spectral-trichotomy Spectral Trichotomy Lemma
• PG-L12-tau-gravitational-wave τ-Gravitational Wave → MathG-D03-window-algebra Window-algebra integers W_n(k)
• PG-L12-tau-gravitational-wave τ-Gravitational Wave → MathG-D05-rank-coordinates Rank coordinates (n, k)
• PG-L12-tau-gravitational-wave τ-Gravitational Wave → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-L12-tau-gravitational-wave τ-Gravitational Wave → MathG-D11-stage-k-cylinder Stage-k Cylinder
• PG-L12-tau-gravitational-wave τ-Gravitational Wave → MathG-D12-progression-operator Progression Operator ρ
• PG-L12-tau-gravitational-wave τ-Gravitational Wave → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-L12-tau-gravitational-wave τ-Gravitational Wave → MathG-O02-window-object Window-algebra object
• PG-L12-tau-gravitational-wave τ-Gravitational Wave → MathG-S02-holomorphy-tower Book I holomorphy tower
• PG-L12-tau-gravitational-wave τ-Gravitational Wave → MathG-T01-hyperfactorization Hyperfactorization theorem
• PG-L12-tau-gravitational-wave τ-Gravitational Wave → MathG-T06-prime-polarity Prime Polarity Theorem
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-D01-iota-tau Master constant ι_τ
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-D06-truth4-logic Truth4 Logic
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-D09-calibrated-split-complex Calibrated Split-Complex Codomain
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-D10-split-complex-scalars Split-Complex Scalars
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-D15-boundary-ring Boundary Ring and Scalars
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-D16-ultrametric-distance τ-Ultrametric Distance
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-T04-central-theorem Central theorem at rank (3, 15)
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-T06-prime-polarity Prime Polarity Theorem
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-T07-split-complex-forced Split-Complex Forced
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-T08-crt-coherence CRT Coherence Constraint
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-T09-algebraic-lemniscate Algebraic Lemniscate
• PG-L13-tau-mercury-precession τ-Mercury Perihelion Precession → MathG-T13-spectral-trichotomy Spectral Trichotomy Lemma
• PG-P01-neutron τ-Neutron → LG-Y02-kinetic-pseudoscalar-channel Kinetic Pseudoscalar Channel
• PG-P01-neutron τ-Neutron → MG-R01-empirical-register Empirical Register (Reg_E)
• PG-P04-photon τ-Photon → MathG-D01-iota-tau Master constant ι_τ
• PG-P04-photon τ-Photon → MathG-D02-tau-categorical τ-categorical structure
• PG-P04-photon τ-Photon → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-P04-photon τ-Photon → MathG-D08-five-generators-def Five Generators (definition)
• PG-P04-photon τ-Photon → MathG-K01-universe-postulate The Universe Postulate (K0)
• PG-P04-photon τ-Photon → MathG-K02-five-generators The five canonical generators (K1–K5)
• PG-P04-photon τ-Photon → MathG-K03-no-omega-axiom The no-ω axiom (K6)
• PG-P04-photon τ-Photon → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-P04-photon τ-Photon → MathG-O01-tau-object Generic τ-object
• PG-P10-higgs-boson τ-Higgs Boson → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-P10-higgs-boson τ-Higgs Boson → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-P11-z-boson τ-Z Boson → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-P11-z-boson τ-Z Boson → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-Q01-mass Mass → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-Q01-mass Mass → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-Q02-energy Energy → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-Q02-energy Energy → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-Q03-mass-energy-relation Mass-Energy Relation → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-Q03-mass-energy-relation Mass-Energy Relation → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-Q07-electric-charge Electric Charge → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-Q07-electric-charge Electric Charge → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-Q10-proper-time Proper Time → MathG-D03-window-algebra Window-algebra integers W_n(k)
• PG-Q10-proper-time Proper Time → MathG-D05-rank-coordinates Rank coordinates (n, k)
• PG-Q10-proper-time Proper Time → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-Q10-proper-time Proper Time → MathG-D08-five-generators-def Five Generators (definition)
• PG-Q10-proper-time Proper Time → MathG-D11-stage-k-cylinder Stage-k Cylinder
• PG-Q10-proper-time Proper Time → MathG-D12-progression-operator Progression Operator ρ
• PG-Q10-proper-time Proper Time → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-Q10-proper-time Proper Time → MathG-O02-window-object Window-algebra object
• PG-Q10-proper-time Proper Time → MathG-S02-holomorphy-tower Book I holomorphy tower
• PG-Q10-proper-time Proper Time → MathG-T01-hyperfactorization Hyperfactorization theorem
• PG-Q10-proper-time Proper Time → MathG-T06-prime-polarity Prime Polarity Theorem
• PG-Q11-operational-distance Operational Distance → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-Q11-operational-distance Operational Distance → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-Q12-spectral-distance-sqrt3 Spectral Distance √3 → MathG-D06-truth4-logic Truth4 Logic
• PG-Q12-spectral-distance-sqrt3 Spectral Distance √3 → MathG-D09-calibrated-split-complex Calibrated Split-Complex Codomain
• PG-Q12-spectral-distance-sqrt3 Spectral Distance √3 → MathG-D10-split-complex-scalars Split-Complex Scalars
• PG-Q12-spectral-distance-sqrt3 Spectral Distance √3 → MathG-D15-boundary-ring Boundary Ring and Scalars
• PG-Q12-spectral-distance-sqrt3 Spectral Distance √3 → MathG-T06-prime-polarity Prime Polarity Theorem
• PG-Q12-spectral-distance-sqrt3 Spectral Distance √3 → MathG-T07-split-complex-forced Split-Complex Forced
• PG-Q12-spectral-distance-sqrt3 Spectral Distance √3 → MathG-T08-crt-coherence CRT Coherence Constraint
• PG-Q12-spectral-distance-sqrt3 Spectral Distance √3 → MathG-T09-algebraic-lemniscate Algebraic Lemniscate
• PG-Q12-spectral-distance-sqrt3 Spectral Distance √3 → MathG-T11-mutual-determination Mutual Determination (5-Way Equivalence)
• PG-Q12-spectral-distance-sqrt3 Spectral Distance √3 → MathG-T13-spectral-trichotomy Spectral Trichotomy Lemma
• PG-Q13-energy-cr-tension Energy as CR-Tension → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-Q13-energy-cr-tension Energy as CR-Tension → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-Q15-holomorphic-entropy Holomorphic Entropy → MathG-D07-4-plus-1-sector 4+1 Sector Decomposition
• PG-Q15-holomorphic-entropy Holomorphic Entropy → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-Q24-velocity Velocity → MathG-D01-iota-tau Master constant ι_τ
• PG-Q24-velocity Velocity → MathG-D06-truth4-logic Truth4 Logic
• PG-Q24-velocity Velocity → MathG-D09-calibrated-split-complex Calibrated Split-Complex Codomain
• PG-Q24-velocity Velocity → MathG-D10-split-complex-scalars Split-Complex Scalars
• PG-Q24-velocity Velocity → MathG-D15-boundary-ring Boundary Ring and Scalars
• PG-Q24-velocity Velocity → MathG-D16-ultrametric-distance τ-Ultrametric Distance
• PG-Q24-velocity Velocity → MathG-L01-idempotent-decomposition Idempotent Decomposition Lemma
• PG-Q24-velocity Velocity → MathG-T04-central-theorem Central theorem at rank (3, 15)
• PG-Q24-velocity Velocity → MathG-T06-prime-polarity Prime Polarity Theorem
• PG-Q24-velocity Velocity → MathG-T07-split-complex-forced Split-Complex Forced
• PG-Q24-velocity Velocity → MathG-T08-crt-coherence CRT Coherence Constraint
• PG-Q24-velocity Velocity → MathG-T09-algebraic-lemniscate Algebraic Lemniscate
• PG-Q24-velocity Velocity → MathG-T13-spectral-trichotomy Spectral Trichotomy Lemma
• LG-M01-consciousness Consciousness → MG-A01-ci-operator-graph CI Operator Graph
• LG-M01-consciousness Consciousness → MG-H01-qualia Qualia (subsymbolic morphisms)
• LG-Y02-kinetic-pseudoscalar-channel Kinetic Pseudoscalar Channel → PG-P01-neutron τ-Neutron
• LG-Y02-kinetic-pseudoscalar-channel Kinetic Pseudoscalar Channel → MG-R01-empirical-register Empirical Register (Reg_E)
• MG-A01-ci-operator-graph CI Operator Graph → LG-M01-consciousness Consciousness
• MG-H01-qualia Qualia (subsymbolic morphisms) → LG-M01-consciousness Consciousness
• MG-R01-empirical-register Empirical Register (Reg_E) → PG-P01-neutron τ-Neutron
• MG-R01-empirical-register Empirical Register (Reg_E) → LG-Y02-kinetic-pseudoscalar-channel Kinetic Pseudoscalar Channel
• MathG-D01-iota-tau Master constant ι_τ → PG-C02-iota-tau Master constant ι_τ
• MathG-D01-iota-tau Master constant ι_τ → PG-U01-tau-second τ-Second
• MathG-D01-iota-tau Master constant ι_τ → PG-U02-tau-meter τ-Meter
• MathG-D01-iota-tau Master constant ι_τ → PG-U03-tau-kilogram τ-Kilogram
• MathG-D01-iota-tau Master constant ι_τ → PG-U04-tau-joule τ-Joule
• MathG-D01-iota-tau Master constant ι_τ → PG-U05-tau-kelvin τ-Kelvin
• MathG-D01-iota-tau Master constant ι_τ → PG-U06-tau-coulomb τ-Coulomb
• MathG-D01-iota-tau Master constant ι_τ → PG-U07-tau-ampere τ-Ampere
• MathG-D01-iota-tau Master constant ι_τ → PG-U08-tau-newton τ-Newton
• MathG-D01-iota-tau Master constant ι_τ → PG-U09-tau-pascal τ-Pascal
• MathG-D01-iota-tau Master constant ι_τ → PG-U10-tau-watt τ-Watt
• MathG-D01-iota-tau Master constant ι_τ → PG-U11-tau-volt τ-Volt
• MathG-D08-five-generators-def Five Generators (definition) → PG-C02-iota-tau Master constant ι_τ
• MathG-D09-calibrated-split-complex Calibrated Split-Complex Codomain → PG-C02-iota-tau Master constant ι_τ
• MathG-D12-progression-operator Progression Operator ρ → PG-C02-iota-tau Master constant ι_τ
• MathG-D13-diagonal-discipline Diagonal Discipline → PG-C02-iota-tau Master constant ι_τ
• MathG-K01-universe-postulate The Universe Postulate (K0) → PG-C02-iota-tau Master constant ι_τ
• MathG-K02-five-generators The five canonical generators (K1–K5) → PG-C02-iota-tau Master constant ι_τ
• MathG-K03-no-omega-axiom The no-ω axiom (K6) → PG-C02-iota-tau Master constant ι_τ
• MathG-T02-rigidity-non-omega Rigidity of τ (non-ω) → PG-C02-iota-tau Master constant ι_τ
• MathG-T03-categoricity-non-omega Categoricity of τ (non-ω) → PG-C02-iota-tau Master constant ι_τ
• MathG-T04-central-theorem Central theorem at rank (3, 15) → PG-C02-iota-tau Master constant ι_τ
• MathG-T06-prime-polarity Prime Polarity Theorem → PG-C02-iota-tau Master constant ι_τ

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