The No-Go Theorem (NGT) of the Theory of Entropicity (ToE)

The Entropic No-Go Theorem (NGT) in John Onimisi Obidi’s radical Theory of Entropicity (ToE) posits that no physical process can outrun or shortcut the finite, causal structure of the universe's entropic field.

 Formally stated as

, it forbids instantaneous action, forcing all processes to obey a maximum entropic propagation rate, treating entanglement not as "spooky action," but as a finite-time, entropy-mediated event. 

Key Aspects of the NGT in ToE

• Fundamental Constraint: The NGT acts as a universal impossibility theorem, similar in function to Bell-type theorems but grounded in entropic causality, restricting any process from extending beyond the "entropic causal cone" (
  

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  ).
• No-Rush Theorem (NRT): A core component of the NGT that mandates a non-zero, minimum interaction time for all physical processes, stating that the universe cannot be "rushed".
• Entropic Field Dynamics: The ToE redefines entropy from a statistical measurement to a dynamic, physical field that generates spacetime and governs the speed of information.
• Resolution of Paradoxes: By limiting information transfer to the finite speed of entropic reconfiguration (identified with 
  

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  ), the NGT reconciles quantum entanglement and relativity, removing the need for instantaneous action. 

The Theory of Entropicity (ToE), proposed as an alternative, audacious framework, asserts that entropy is the fundamental, generative substrate for all physical reality. 

Would you like more details on how the No-Rush Theorem specifically applies to quantum decoherence?