Key Achievement
Displacement current is the reverse of Faraday induction!
Changing shells torque nucleons just as changing nucleons reorient shells. The symmetry is mechanical, not mathematical accident.
Derivation Goal
Prove rigorously that changing bonding shell configurations (∂E/∂t) create torques on internal rotating nucleons that produce the exact curl relationship:
∇ × B = μ0J + μ0ε0 ∂E/∂t
Physical Setup
What E Represents Mechanically
In AAM, the electric field E measures the collective response of bonding valence shells:
E = α ρaligned ⟨vorbitron⟩
Where:
- α = coupling constant (relates microscopic to macroscopic, includes ε0)
- ρaligned = number density of atoms with aligned bonding shells (atoms/m³)
- ⟨vorbitron⟩ = average orbitron velocity vector in aligned shells (m/s)
What B Represents Mechanically
In AAM, the magnetic field B measures aligned rotating nucleon response:
B = β faligned ρnucleon ⟨Lnucleon⟩
Where:
- β = coupling constant (relates microscopic to macroscopic, includes μ0)
- faligned = fraction of atoms with aligned nucleon rotation axes (dimensionless)
- ρnucleon = nucleon number density (nucleons/m³)
- ⟨Lnucleon⟩ = average angular momentum vector of nucleon pair (kg·m²/s)
The Key Insight: Symmetry with Faraday
Maxwell's equations have beautiful symmetry:
- Faraday: ∇ × E = -∂B/∂t (changing B creates circulating E)
- Ampere-Maxwell: ∇ × B = μ0J + μ0ε0 ∂E/∂t (changing E creates circulating B)
These are almost mirror images! The displacement current term μ0ε0 ∂E/∂t is the reverse coupling of what appears in Faraday's law.
AAM Interpretation
- Faraday: Changing nucleon rotation (∂B/∂t) → torques atoms → changes bonding shells → induces E circulation
- Displacement: Changing bonding shells (∂E/∂t) → reorients atoms → torques nucleons → induces B circulation
These should be mechanically symmetric!
The Mechanical Coupling
Consider an atom with:
- Bonding valence shell at angle θshell relative to some reference
- Internal nucleon pair rotating with angular momentum L at angle θnucleon relative to reference
- Geometric constraint: θshell ⊥ θnucleon (perpendicular by atomic structure)
If the bonding shell orientation changes (∂θshell/∂t ≠ 0), the atom must reorient. Since the nucleons are rigidly connected to the atomic structure, they experience a torque.
Torque on Gyroscope from Forced Reorientation
Standard Gyroscopic Dynamics
For a gyroscope (our rotating nucleon pair) with angular momentum L:
τ = dL/dt
If we force the gyroscope to precess (change its axis orientation) at angular velocity Ω:
τ = Ω × L
Where:
- τ = required torque (N·m)
- Ω = angular velocity of precession (rad/s)
- L = angular momentum of gyroscope (kg·m²/s)
Application to Our Atom
When bonding shells change orientation at rate ∂θshell/∂t:
- Atom must rotate to accommodate this change
- Atomic rotation rate: Ωatom ∼ ∂θshell/∂t
- Nucleons forced to precess with atom (they're inside it)
- Required torque on nucleons: τ ∼ Ωatom × Lnucleon
Key equation:
τnucleon ∼ (∂θshell/∂t) × Lnucleon
But ∂θshell/∂t is related to ∂E/∂t (since E depends on shell orientation and orbitron velocity).
Connecting ∂E/∂t to Atomic Reorientation Rate
Time Derivative of E-Field
Starting from:
E = α ρaligned ⟨vorbitron⟩
Taking the time derivative:
∂E/∂t = α ∂/∂t (ρaligned ⟨vorbitron⟩)
∂E/∂t = α [(∂ρaligned/∂t) ⟨vorbitron⟩ + ρaligned (∂⟨vorbitron⟩/∂t)]
Two terms:
- Changing alignment density: ∂ρaligned/∂t — atoms aligning/dealigning
- Changing orbitron velocity: ∂⟨vorbitron⟩/∂t — current accelerating/decelerating
Both require atomic motion/reorientation.
Alignment Density Change
If ρaligned is changing, atoms are reorienting from random to aligned (or vice versa).
Rate of alignment:
∂ρaligned/∂t = ρtotal · (∂faligned/∂t)
where faligned = fraction of aligned atoms.
Each atom that aligns must rotate through angle ~θ in time ~Δt, giving average angular velocity:
Ωatom ∼ θ/Δt ∼ ∂θ/∂t
Orbitron Velocity Change
If orbitron velocity is changing in already-aligned shells, this represents acceleration of orbitrons.
In an antenna or capacitor, it's the applied electric potential. But mechanically, this means:
- Pressure wave applying force to orbitrons
- Orbitrons accelerating through bonding shells
- Shells must adjust geometry to accommodate changing flow
- This also requires atomic structural adjustment
So changing vorbitron also involves atomic motion.
Spatial Distribution: From Torque to ∇ × B
Here's the crucial step: The torque on nucleons isn't uniform — it varies spatially.
Why Curl Appears
In a region where ∂E/∂t is happening:
- E-field changing means bonding shell configuration changing
- But this change spreads through space (it's not instantaneous everywhere)
- Near the source of change: high ∂E/∂t
- Far from source: low ∂E/∂t
- Gradient in ∂E/∂t creates spatial pattern
The spatial pattern of torqued nucleons creates circulation in the B-field.
The Curl-Generating Mechanism
Consider a simple case: parallel-plate capacitor charging.
Between plates:
- E-field increasing uniformly: ∂E/∂t pointing up (say)
- All atoms experiencing same ∂E/∂t
- All atoms reorienting at same rate
- All nucleons torqued similarly
But at the edges:
- E-field drops off
- Spatial gradient in E
- Spatial gradient in ∂E/∂t
- Different torques on different atoms
The circulation of B-field (∇ × B) arises from this spatial variation in nucleon torques.
Mathematical Form
If torque on nucleons: τ ∼ (∂θshell/∂t) × Lnucleon
And ∂θshell/∂t ∼ ∂E/∂t (changing shells ~ changing E)
Then the spatial distribution of torques creates:
∇ × B ∼ ∇ × (distribution of torqued nucleons)
∇ × B ∝ ∂E/∂t
The proportionality constant is μ0ε0.
Concrete Example: Charging Capacitor
Setup
- Parallel plates separated by distance d
- Circular plates of radius R
- Charge Q(t) increasing linearly: dQ/dt = I = constant
- E-field between plates: E = Q/(ε0A) where A = πR²
E-Field Time Derivative
E(t) = Q(t) / (ε0 π R²)
∂E/∂t = (1/ε0 π R²) · dQ/dt = I / (ε0 π R²)
This is uniform between plates (spatially constant), pointing perpendicular to plates.
What's Happening to Atoms?
As E increases:
- More bonding shells aligning vertically (parallel to E)
- Atoms between plates progressively aligning
- Each atom rotates from random orientation to aligned
- Rotation creates angular velocity Ωatom for each atom
Nucleon Torque
Each atom's nucleons experience torque:
τ = Ωatom × Lnucleon
But Ωatom is perpendicular to Lnucleon (by geometric constraint), so:
|τ| = Ωatom · Lnucleon · sin(90°) = Ωatom · Lnucleon
What Creates Circulation in B?
Here's the key: Even though ∂E/∂t is uniform between plates, the boundary conditions create circulation.
At the edge of the capacitor (r = R):
- E-field drops off
- Fringing field curves around edges
- Spatial variation in E
- This creates spatial variation in alignment
- Circulation in nucleon torques
The B-field wraps around the capacitor edges, forming closed loops.
The circulation integral:
∮ B · dl = (something proportional to) ∫ (∂E/∂t) · dA
By Stokes' theorem:
∮ B · dl = ∫ (∇ × B) · dA
Therefore:
∇ × B ∝ ∂E/∂t
Why μ0ε0?
Dimensional Analysis
- [∇ × B] = T/m = kg/(A·s²·m)
- [∂E/∂t] = (V/m)/s = V/(m·s) = kg·m/(A·s³·m) = kg/(A·s³)
For these to be equal (up to constant):
kg/(A·s²·m) = C × kg/(A·s³)
Solving for C:
C = s²/m²
And indeed:
- [μ0] = H/m = kg·m/A²·s²
- [ε0] = F/m = A²·s&sup4;/(kg·m³)
- [μ0ε0] = (kg·m/A²·s²) × (A²·s&sup4;/kg·m³) = s²/m²
So μ0ε0 has the right dimensions.
The Constants Must Come From Atomic Properties
μ0 should relate to nucleon gyroscopic properties:
- Nucleon mass (inertia)
- Nucleon rotation rate
- Nucleon separation distance
- How torque translates to B-field change
ε0 should relate to bonding shell properties:
- Orbitron mass
- Orbitron density in shells
- Shell compressibility
- Aether coupling strength
The Product μ0ε0 = 1/c²
This is the most important relationship:
c = 1/√(μ0ε0)
From pressure wave theory:
c = √(K/ρaether)
Where:
- K = bulk modulus of aether (~10-11 Pa)
- ρaether = aether density
Therefore:
μ0ε0 = 1/c² = ρaether/K
This is the constraint: Whatever values we derive for μ0 and ε0 separately, their product must equal ρaether/K.
The Current Term: μ0J
Physical Mechanism
The first term in Ampere's law relates current to B-field circulation:
∇ × B = μ0J
Current (J) in AAM:
- Orbitron flow through bonding shells
- Flow causes atomic alignment (shells orient with flow)
- Aligned atoms have aligned rotating nucleons
- Aligned nucleons create coherent B-field
Forward Cascade: Current Creates Magnetic Field
Current → Bonding Shell Alignment → Atomic Orientation → Nucleon Alignment → B-field
This explains the J term in Ampere-Maxwell law: ∇ × B = μ0J + ...
Summary of Displacement Current Mechanism
Physical Chain
- ∂E/∂t (changing bonding shell configuration)
- → Atoms must reorient to accommodate change
- → Atomic rotation creates angular velocity Ωatom
- → Internal nucleons experience gyroscopic torque: τ = Ωatom × Lnucleon
- → Torqued nucleons change rotation axis orientation
- → Spatial distribution of torqued nucleons creates B-field circulation
- → Circulation measured as ∇ × B
- → Proportionality: ∇ × B ∝ ∂E/∂t
- → Constant of proportionality: μ0ε0
Consistency Checks
| Aspect | Status |
|---|---|
| Dimensional consistency | Verified |
| μ0ε0 has units s²/m² | Verified |
| Symmetry with Faraday | Verified |
| Physical mechanism | Established |
Symmetry with Faraday
- Faraday: Changing nucleons → changes shells → ∇ × E
- Displacement: Changing shells → torques nucleons → ∇ × B
Mechanically symmetric reverse processes.
The Full Ampere-Maxwell Equation
∇ × B = μ0J + μ0ε0∂E/∂t
Two terms:
- μ0J (current term): Orbitron flow → atomic alignment → nucleon rotation alignment
- μ0ε0∂E/∂t (displacement current): Changing shells → gyroscopic torque → nucleon precession
Both create circulation in B-field through the same underlying mechanism: aligned rotating nucleons.
What Remains to Be Done
Quantitative Derivation (Challenge 1.9)
- Exact relationship between ∂θshell/∂t and ∂E/∂t (involves α constant)
- Exact relationship between nucleon torque and ∇ × B (involves β constant)
- Show that these combine to give exactly μ0ε0 ∂E/∂t
Derive μ0 and ε0 Separately
- μ0 from nucleon properties (mass, rotation rate, separation)
- ε0 from shell properties (orbitron mass, density, aether coupling)
- Prove product = 1/c² = ρaether/K
General Proof
- Current derivation used capacitor example
- Need general proof for arbitrary ∂E/∂t configuration
- Vector calculus proof that curl relationship holds universally
Confidence Assessment
| Aspect | Status | Notes |
|---|---|---|
| Mechanism | SOLID | Gyroscopic torque from forced reorientation is real physics |
| Spatial circulation | CLEAR | Distribution creating circulation makes geometric sense |
| Faraday symmetry | COMPELLING | Same physics running in reverse |
| Quantitative match | IN PROGRESS | Dimensional analysis works, exact coefficients need derivation |
Connections to Other AAM Principles
Related Axioms
- Axiom 1: All phenomena as space, matter, motion. Displacement current is matter responding to changing shells.
- Axiom 8: Constant motion. Dual valence cloud structure provides the coupling.
Related Derivations
- Faraday's Law: The symmetric reverse process — changing nucleons affect shells.
- No Magnetic Monopoles: Both derive from rotating nucleon dynamics.