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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]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:
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Entropy as a Dynamic Field:ToE reinterprets entropy as a fundamental field, influencing how objects move, interact, and evolve.
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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.
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Implications for Physics:This theorem has implications for various physical phenomena, potentially impacting how we understand gravity, quantum mechanics, and the arrow of time.
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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.
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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.
This entry is adapted from: https://doi.org/10.33774/coe-2025-n4n45
References
- @misc{obidi2025Theentropic_Unified_Framework_for_QG_1_EFFH_CambridgeCOE, author = {Obidi, John Onimisi}, title = {The Entropic Force-Field Hypothesis: A Unified Framework for Quantum Gravity}, year = {18th February 2025}, howpublished = {Cambridge University}, url = {https://doi.org/10.33774/coe-2025-fhhmf}}@misc{obidi2025exploring_Insights_Investigations_2_EFFH_CambridgeCOE, author = {Obidi, John Onimisi}, title = {Exploring the Entropic Force-Field Hypothesis (EFFH): New Insights and Investigations}, year = {20th February 2025}, howpublished = {Cambridge University}, url = {https://doi.org/10.33774/coe-2025-3zc2w}}@misc{obidi2025CorrectionstotheShapiroDelay_3_EFFH_CambridgeCOE, author = {Obidi, John Onimisi}, title = {Corrections to the Classical Shapiro Time Delay in General Relativity (GR) from the Entropic Force-Field Hypothesis (EFFH)}, year = {11th March 2025}, howpublished = {Cambridge University}, url = {https://doi.org/10.33774/coe-2025-v7m6c}}@misc{obidi2025Howthegeneralized_decel_accel_of_universe_4_GEEECambridgeCOE, author = {Obidi, John Onimisi}, title = {How the Generalized Entropic Expansion Equation (GEEE) Describes the Deceleration and Acceleration of the Universe in the Absence of Dark Energy}, year = {12th March 2025}, howpublished = {Cambridge University}, url = {https://doi.org/10.33774/coe-2025-6d843}}@misc{obidi2025ToE_validates_GR_mercury_perihelion_5_ToECambridgeCOE, author = {Obidi, John Onimisi}, title = {The Theory of Entropicity (ToE): An Entropy-Driven Derivation of Mercury’s Perihelion Precession Beyond Einstein’s Curved Spacetime in General Relativity (GR)}, year = {16th March 2025}, howpublished = {Cambridge University}, url = {https://doi.org/10.33774/coe-2025-g55m9}}@misc{obidi2025ToE_validates_GR_starlight_6_EtaCambridgeCOE, author = {Obidi, John Onimisi}, title = {The Theory of Entropicity (ToE) Validates Einstein’s General Relativity (GR) Prediction for Solar Starlight Deflection via an Entropic Coupling Constant $\eta$}, year = {23rd March 2025}, howpublished = {Cambridge University}, url = {https://doi.org/10.33774/coe-2025-1cs81}}@misc{obidi2025Attosecondconstraints_7_ToEEvidenceCambridgeCOE, author = {Obidi, John Onimisi}, title = {Attosecond Constraints on Quantum Entanglement Formation as Empirical Evidence for the Theory of Entropicity (ToE)}, year = {25th March 2025}, howpublished = {Cambridge University}, url = {https://doi.org/10.33774/coe-2025-30swc}}@misc{obidi2025Reviewandanalysis_8_EntropicFrameworkCambridgeCOE, author = {Obidi, John Onimisi}, title = {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}, year = {29th March 2025}, howpublished = {Cambridge University}, url = {https://doi.org/10.33774/coe-2025-7lvwh}}@misc{obidi2025EinsteinandBohrReconciled_9_EntropyToECambridgeCOE, author = {Obidi, John Onimisi}, title = {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: A Befitting Contribution to this Year’s Centennial Reflection and Celebration of the Birth of Quantum Mechanics}, year = {14th April 2025}, howpublished = {Cambridge Univserity}, url = {https://doi.org/10.33774/coe-2025-vrfrx}}@misc{obidi2025OntheDiscoveryofNewLawsofConservation_10_EntropyToECambridgeCOE, author = {Obidi, John Onimisi}, title = {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)}, year = {14th June 2025}, howpublished = {Cambridge Univserity}, url = {https://doi.org/10.33774/coe-2025-n4n45}}@misc{obidi2025MasterEquationToE_Encyclopedia_pub_1, author = {Obidi, John Onimisi}, title = {Master Equation of the Theory of Entropicity (ToE)}, howpublished = {Encyclopedia}, year = {2025}, url = {https://encyclopedia.pub/entry/58596}, note = {Accessed: 04 July 2025},}
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