The No-Rush Theorem in Theory of Entropicity (ToE)

The No-Rush Theorem in Theory of Entropicity (ToE): Comparison

Please note this is a comparison between Version 9 by John Onimisi Obidi and Version 8 by John Onimisi Obidi.

Here, we give a brief introduction to the No-Rush Theorem of the Theory of Entropicity (ToE), where we state that "Nature cannot be rushed," so that no interaction in nature can proceed instantaneously.

Theoretical Physics
Quantum Physics
Field Theory
Particle Physics

The "No-Rush Theorem" in the Theory of Entropicity (ToE), as first formulated by John Onimisi Obidi^{[1][2][3][4][5][6][7][8][9][10][11][12]} establishes a minimum interaction time for physical processes, stating that no physical interaction can occur instantaneously. It is a core principle of ToE, which proposes that entropy is not just a measure of disorder but a fundamental, dynamic field driving physical phenomena.

Here's a more detailed explanation:

Entropy as a Dynamic Field:

ToE reinterprets entropy as a fundamental field, influencing how objects move, interact, and evolve.
No Instantaneous Interactions:

The No-Rush Theorem posits that due to the nature of this entropic field, interactions cannot occur instantaneously. There must be a finite duration for any process to unfold.
Implications for Physics:

This theorem has implications for various physical phenomena, potentially impacting how we understand gravity, quantum mechanics, and the arrow of time.
Connection to Other Concepts:

The No-Rush Theorem can be seen as related to the concept of decoherence in open quantum systems, where entropy-driven processes lead to the loss of quantum coherence. It also connects to the idea of an entropic force, where motion arises from entropy seeking equilibrium.
Beyond Traditional Physics:

ToE, with its No-Rush Theorem, offers a different perspective compared to traditional physics, which often assumes instantaneous interactions in certain contexts.

References

Obidi, John Onimisi. The Entropic Force-Field Hypothesis: A Unified Framework for Quantum Gravity. Cambridge University; 18 February 2025. https://doi.org/10.33774/coe-2025-fhhmf
Obidi, John Onimisi. Exploring the Entropic Force-Field Hypothesis (EFFH): New Insights and Investigations. Cambridge University; 20 February 2025. https://doi.org/10.33774/coe-2025-3zc2w
Obidi, John Onimisi. Corrections to the Classical Shapiro Time Delay in General Relativity (GR) from the Entropic Force-Field Hypothesis (EFFH). Cambridge University; 11 March 2025. https://doi.org/10.33774/coe-2025-v7m6c
Obidi, John Onimisi. How the Generalized Entropic Expansion Equation (GEEE) Describes the Deceleration and Acceleration of the Universe in the Absence of Dark Energy. Cambridge University; 12 March 2025. https://doi.org/10.33774/coe-2025-6d843
Obidi, John Onimisi. The Theory of Entropicity (ToE): An Entropy-Driven Derivation of Mercury’s Perihelion Precession Beyond Einstein’s Curved Spacetime in General Relativity (GR). Cambridge University; 16 March 2025. https://doi.org/10.33774/coe-2025-g55m9
Obidi, John Onimisi. The Theory of Entropicity (ToE) Validates Einstein’s General Relativity (GR) Prediction for Solar Starlight Deflection via an Entropic Coupling Constant η. Cambridge University; 23 March 2025. https://doi.org/10.33774/coe-2025-1cs81
Obidi, John Onimisi. Attosecond Constraints on Quantum Entanglement Formation as Empirical Evidence for the Theory of Entropicity (ToE). Cambridge University; 25 March 2025. https://doi.org/10.33774/coe-2025-30swc
Obidi, John Onimisi. Review and Analysis of the Theory of Entropicity (ToE) in Light of the Attosecond Entanglement Formation Experiment: Toward a Unified Entropic Framework for Quantum Measurement, Non-Instantaneous Wave-Function Collapse, and Spacetime Emergence. Cambridge University; 29 March 2025. https://doi.org/10.33774/coe-2025-7lvwh
Obidi, John Onimisi. Einstein and Bohr Finally Reconciled on Quantum Theory: The Theory of Entropicity (ToE) as the Unifying Resolution to the Problem of Quantum Measurement and Wave Function Collapse. Cambridge University; 14 April 2025. https://doi.org/10.33774/coe-2025-vrfrx
Obidi, John Onimisi. On the Discovery of New Laws of Conservation and Uncertainty, Probability and CPT-Theorem Symmetry-Breaking in the Standard Model of Particle Physics: More Revolutionary Insights from the Theory of Entropicity (ToE). Cambridge University; 14 June 2025. https://doi.org/10.33774/coe-2025-n4n45
Obidi, John Onimisi. Master Equation of the Theory of Entropicity (ToE). Encyclopedia.pub; 2025. https://encyclopedia.pub/entry/58596.. Accessed 04 July 2025.
A Concise Introduction to the Evolving Theory of Entropicity (ToE). HandWiki; 2025. https://handwiki.org/wiki/Physics:A_Concise_Introduction_to_the_Evolving_Theory_of_Entropicity_(ToE). Accessed 04 July 2025.A Concise Introduction to the Evolving Theory of Entropicity (ToE). HandWiki; 2025. https://handwiki.org/wiki/Physics:A_Concise_Introduction_to_the_Evolving_Theory_of_Entropicity_(ToE). Accessed 09 July 2025.