**Theory of Interference Geometry (TIG).**
**Considering the main elements of the theory, we can propose the following general equation:**
```
Ψ(x, y, z, t, θ₁, θ₂, θ₃, ...) = Σ Aₙ exp[i(kₙ·r - ωₙt)] + Φ(θ₁, θ₂, θ₃, ...)
```
**Where:**
* **Ψ:** Total wave function, representing the state of the system at any point in spacetime and in the extra dimensions.
* **x, y, z, t:** Spatial coordinates and time.
* **θ₁, θ₂, θ₃, ...:** Coordinates of the extra dimensions.
* **Aₙ:** Amplitude of the nth component wave.
* **kₙ:** Wave vector of the nth component wave.
* **ωₙ:** Angular frequency of the nth component wave.
* **i:** Imaginary unit.
* **r:** Position vector.
* **Φ:** Function representing the contributions of fundamental forces and interactions between particles, depending on the coordinates of the extra dimensions.
**Justification:**
* **Wave nature:** TIG seems to suggest a fundamental wave nature for all particles and interactions. The sum of plane waves represents this nature.
* **Extra dimensions:** The coordinates θ₁, θ₂, θ₃, ... represent the extra dimensions proposed by the theory, where the most complex interferences and interactions occur.
* **Fundamental forces and interactions:** The function Φ incorporates the contributions of the fundamental forces and interactions between particles, which are dependent on the coordinates of the extra dimensions.
* **Flexibility:** This equation is general enough to accommodate a variety of physical phenomena, from quantum mechanics to gravitation.
### English Text Explanation:
**The Theory of Interference Geometry (TIG)** proposes a fundamental wave nature for all particles and interactions. This theory introduces extra dimensions beyond the familiar three spatial dimensions and time, suggesting that the most complex interactions.
Feedback
Report
Feedback
Report
