📚 Context from Literature on the Novel Derivations of Einstein's Relativistic Kinematics and General Relativity: Progress of the Theory of Entropicity (ToE)

Methodology of the Theory of Entropicity (ToE)

1. Entropy field + conservation principle + density
2. Derivation of relativistic effects (time dilation, length contraction, mass increase)
3. A deviation when the speed of light c changes

References and Historical Context 

Some partial parallels exist, but none match ToE's full claim:

1. Libations, G. (2025). Thermodynamic origins of relativity. Scientific Reports.
2. Parker & Jeynes (2021). Entropic relativistic dynamics. Universe.
3. Chirco et al. (2022). Spacetime thermodynamics. arXiv.
4. Bianconi (2025). Gravity from entropy. Phys. Rev. D.
5. Amari (2016). Information Geometry.
6. Carmona et al. (2019). Deformed relativistic kinematics.
7. Pfeifer & Relancio (2022). Modified kinematics.
8. Russo & Townsend (2009). Relativistic motion.
9. Carroll (2010). Arrow of time.
10. Obidi (2025–2026). Theory of Entropicity (ToE).

📚 Key References

1. Livadiotis, G., & McComas, D. (2025). Thermodynamic and kinematic origins of relativity. Scientific Reports.
2. Parker, M. C., & Jeynes, C. (2021). Relativistic entropic Hamiltonian. Universe.
3. Chirco, G., Liberati, S., & Relancio, J. (2022). Spacetime thermodynamics. arXiv.
4. Pfeifer, C., & Relancio, J. (2022). Deformed relativistic kinematics. EPJC.
5. Russo, J. G., & Townsend, P. K. (2009). Relativistic kinematics. J. Phys. A.
6. Sahoo, R. (2016). Relativistic kinematics. arXiv.
7. Carmona, J. M. et al. (2019). Deformations of relativistic kinematics. Symmetry.
8. Carrera, M. (2010). Geometrical methods in relativity.
9. Bianconi, G. (2025). Gravity from entropy.
10. Obidi, J. O. (2025–2026). Theory of Entropicity.