What is the Kolmogorov-Obidi Lineage (KOL)?

The **Kolmogorov-Obidi Lineage (KOL)** is a foundational framework in the Theory of Entropicity that links Kolmogorov-style information theory with Obidi’s entropy-based physics program. It is described as a “master correspondence” structure that maps earlier information-theoretic and gravitational ideas into the Theory of Entropicity, with the Obidi Action serving as the central unifying principle [1][2].

## Formalized version

KOL can be described as a conceptual lineage that treats entropy and information as the organizing basis of physical law, rather than as secondary descriptors. In the source material, it is associated with a correspondence table, an entropic wave equation, and a broader attempt to unify quantum, gravitational, and information-theoretic structures under one entropic framework [1][2].

## Wiki-style version

**Kolmogorov-Obidi Lineage (KOL):** A theoretical framework within the Theory of Entropicity that connects Kolmogorov-inspired information concepts to Obidi’s entropic physics, aiming to unify entropy, information, quantum behavior, and gravity through a single correspondence structure [1][2].

Would you like me to turn this into a **HandWiki-style intro paragraph** or a **more technical definition with equations**?

On Obidi's "The Question of c" and the Resolution to Cosmic Expansion in the Theory of Entropicity (ToE)

 

In the context of the Theory of Entropicity (ToE), formulated by John Onimisi Obidi, "The Question of c" (TQoC) refers to a fundamental reinterpretation of the speed of light, $c$. [1, 2]

What is the "Question of c"?

Rather than viewing $c$ as a geometric constant of spacetime (as in Einstein's Relativity), Obidi's framework treats it as an emergent entropic limit. It addresses the "why" behind the universal speed limit, positing that $c$ is the maximum rate at which the "entropic field" can reconfigure information. [1, 3, 4, 5]

Key Concepts in Obidi's Derivation

• Entropy-First Cosmology: Spacetime and matter are not fundamental; they emerge from gradients in a dynamical entropic field, $S(x)$.
• The No-Rush Theorem: This principle states that no physical interaction can be instantaneous because information redistribution has a finite throughput rate—this rate is $c$.
• Relativity as an Inevitability: Effects like time dilation and length contraction are seen as "entropic resistance" (ERP) when systems attempt to reconfigure at speeds approaching this fundamental limit.
• Cosmic Expansion: One of the critical debates in the Alemoh-Obidi Correspondence (AOC) involved reconciling a finite $c$ with superluminal cosmic expansion, leading to a distinction between local signal propagation and global manifold growth. [4, 5, 6, 7, 8, 9, 10]

Detailed papers on these derivations, including the Master Entropic Equation (MEE) and the Obidi Action, can be found in his collected works. [11, 12]

Are you interested in the mathematical mechanics of the Obidi Action or how this theory specifically addresses quantum entanglement?

 

[1] https://www.cambridge.org

[2] https://medium.com

[3] https://medium.com

[4] https://medium.com

[5] https://medium.com

[6] https://client.prod.orp.cambridge.org

[7] https://medium.com

[8] https://medium.com

[9] https://www.cambridge.org

[10] https://medium.com

[11] https://independent.academia.edu

[12] https://www.researchgate.net

 

"Obidi's Question of c" (often abbreviated as TQoC) refers to a central theoretical challenge formulated by John Onimisi Obidi within his Theory of Entropicity (ToE), which was developed through a series of correspondences with Daniel Moses Alemoh between 2024 and 2026. [1, 2, 3]

The question challenges the traditional Einsteinian view of the speed of light (\(c\)) as a fundamental geometric constant of spacetime, proposing instead that it is an emergent, finite limit dictated by entropy. [1, 2]

Key aspects of "The Question of c" in the Theory of Entropicity include:

• Entropy-First Cosmology: Rather than light defining spacetime, Obidi proposes that entropy is the primary field from which spacetime and matter emerge.
• Definition of c: The speed of light is defined as the maximum rate at which the entropic field can reconfigure information, also known as the Entropic Speed Limit (ESL) or Entropic Time/Transmission/Transformation Limit (ETL).
• The "No-Rush" Theorem: Obidi’s theory suggests that physical interaction cannot be instantaneous; it must respect the time needed for entropic reconfigurations.
• Resolution to Cosmic Expansion: The theory distinguishes between local signal propagation (limited by \(c\)) and the global evolution of the entropic manifold to resolve issues regarding superluminal expansion. [1, 2, 3, 4, 5]

This framework reinterprets relativistic effects—such as time dilation and mass increase—not as distortions of a geometric grid, but as "entropic resistance" (ERP) when systems are forced to reorganize too quickly. [1]

 

Would you like to know more about the mathematical mechanics of the Obidi Action or see a comparison with Einstein's theory of relativity?

 

 

The Long Path from Kolmogorov to Obidi: A New Principle and Path of Least Action in the Theory of Entropicity (ToE)

 

The relationship between John Onimisi Obidi and Andrey Kolmogorov is defined by the Kolmogorov–Obidi Lineage (KOL), an intellectual framework that connects Kolmogorov’s foundational work in probability and information theory to Obidi’s 2025 Theory of Entropicity (ToE). [1, 2]

The Kolmogorov–Obidi Lineage (KOL)

This lineage traces the evolution of mathematical concepts from Kolmogorov’s 1933 probability axioms to Obidi’s modern theoretical physics frameworks. Key components include: [3, 4]

• The Obidi Action: A central tenet in the ToE that treats all information-theoretic quantities from the KOL as limiting cases.
• Derivation of Axioms: Obidi provides a rigorous derivation of Kolmogorov’s probability axioms and Shannon entropy from the Obidi Action, positioning probability as a conservation law.
• The Alemoh–Obidi Correspondence (AOC): A series of intellectual exchanges (2024–2026) between Obidi and mathematician Daniel Alemoh that further solidified this lineage within modern theoretical physics. [1, 5, 6, 7, 8]

Foundations and Evolutions

While Andrey Kolmogorov (1903–1987) is celebrated for establishing modern probability theory and Kolmogorov complexity, Obidi’s work seeks to "elevate" these concepts by integrating entropy into a unified physical ontology. [2, 9, 10]

• Information to Entropicity: Obidi’s "The Road from Kolmogorov" series explores the transition from information as a mathematical concept to entropy as a fundamental physical driver.
• Physical Emergence: Obidi uses the KOL to address complex problems like the emergence of spacetime and the Question of c (TQoC), reinterpreting the speed of light as an entropic limit. [2, 7, 9]

Would you like to explore the specific mathematical derivations of Kolmogorov's axioms within the Theory of Entropicity?

 

[1] https://notd.io

[2] https://medium.com

[3] https://notd.io

[4] https://www.youtube.com

[5] https://www.researchgate.net

[6] https://medium.com

[7] https://medium.com

[8] https://www.cambridge.org

[9] https://client.prod.orp.cambridge.org

[10] https://www.youtube.com

 

 

John Onimisi Obidi’s "Theory of Entropicity (ToE)" (2025/2026) extends the foundational work of Andrey Kolmogorov, aiming to bridge Kolmogorov's probability axioms with a new entropy-driven cosmology. While Kolmogorov (1903-1987) established rigorous probability theory and complexity, Obidi uses those principles to derive a new "Theory of Entropicity (ToE)". [1, 2, 3, 4, 5]

 

Key Connections & Distinctions

• Kolmogorov’s Foundation: Kolmogorov revolutionized mathematics by formalizing probability with axioms in 1933. He also developed Kolmogorov complexity, which measures the complexity of individual objects.
• Obidi’s Extension: John Onimisi Obidi builds upon this legacy, particularly by reviewing Kolmogorov's probability and Shannon entropy.
• Theory of Entropicity (ToE): Obidi’s work, as mentioned in, attempts to establish a new foundational theory that uses entropy to explain physical reality, such as the emergence of spacetime and the speed of light (\(c\)) as an "entropic limit," as discussed in.
• The Lineage: The work is framed as a "road from Kolmogorov to the foundations of the Theory of Entropicity," evolving from information as probability to a broader theory of entropy. [1, 2, 3, 4, 5, 6, 7, 8]

 

If you would like to dive deeper, we can provide you with information on:

• The specifics of Obidi's Theory of Entropicity.
• Kolmogorov's foundational work in probability and complexity.
• Specific applications of these theories in physics or computer science.

A Brief Explanation of the Kolmogorov-Obidi Correspondence (KOC) in the Theory of Entropicity (ToE): From Algorithmic Information Complexity to the Entropic Theory of Fields 

In the Theory of Entropicity (ToE), the Kolmogorov–Obidi Correspondence (KOC)—often referred to as the Kolmogorov–Obidi Master Correspondence Table—serves as a formal mapping that bridges algorithmic information theory and entropic field dynamics. [1]

Originated by John Onimisi Obidi in 2025, the theory elevates entropy from a statistical measure to a fundamental dynamical field ($S(x)$) that governs the universe. The KOC specifically establishes the following: [2, 3]

• Informational to Physical Mapping: It links Kolmogorov Complexity ($K(x)$), which measures the intrinsic information of individual objects, to the Obidi Action, a variational principle that defines how the entropic field evolves in physical spacetime.
• Structure of the Master Table: The correspondence table verifies the compliance of the "Six Pillars" of the theory, aligning mathematical constants and geometric structures with entropic field operators.
• Geodesic Derivation: It provides the mathematical lineage from Kolmogorov’s realization that dynamics generate information to the ToE assertion that entropy generates all dynamics, such as Entropic Geodesics. In this framework, gravity is reinterpreted as the tendency of the entropic field to minimize resistance, replacing traditional metric geodesics.
• Reinterpretation of Constants: The correspondence supports the "No-Rush Theorem," which reinterprets the speed of light ($c$) as the maximum rate at which the entropic field can reorganize information, rather than an arbitrary universal constant. [1, 2, 3, 4, 5]

The Theory of Entropicity (ToE) is currently an emerging proposal in theoretical physics, primarily documented through research papers and preprints on platforms like Encyclopedia MDPI and ResearchGate. [1, 6, 7]

Would you like to see the mathematical formulation of the Obidi Action or more details on the No-Rush Theorem (NRT)?

 

[1] https://www.researchgate.net

[2] https://medium.com

[3] https://medium.com

[4] https://entropicity.github.io

[5] https://medium.com

[6] https://encyclopedia.pub

[7] https://encyclopedia.pub

 

The Kolmogorov-Obidi Correspondence (KOC), often referred to within the broader Kolmogorov-Obidi Lineage (KOL), is a foundational concept in the 2026 Theory of Entropicity (ToE) proposed by John Onimisi Obidi. It represents a bridge between classical algorithmic information theory and modern entropic field theory. 

 

Here is an overview of the KOC within ToE:

 

Context: The Theory of Entropicity (ToE)

ToE proposes that entropy is not a byproduct of disorder, but the fundamental, dynamical field of reality from which gravity, space, time, and matter emerge. In this framework, the Obidi Action (c) acts as a variational principle, where entropy is the primary substrate. 

 

Kolmogorov-Obidi Correspondence (KOC) Explained

The KOC bridges Kolmogorov's algorithmic information complexity with Obidi's entropic field dynamics: 

• Foundation: It links Kolmogorov Complexity (the length of the shortest computer program that produces an object) to the Obidi Action (a variational principle governing the dynamics of the entropy field).
• Significance: It serves as a mathematical correspondence, suggesting that the "bits" of information required to describe a physical state (Kolmogorov) are fundamentally equivalent to the "entropy" needed to generate that state via the Obidi action.
• Evolution: The KOC positions ToE as the natural successor to traditional information-theoretic approaches, moving from "information as a description of objects" to "information as the dynamic substance of reality". 

 

Role in the Theory of Entropicity (ToE)

1. Fundamental Correspondence: It establishes that the minimum description length (Kolmogorov complexity) of a physical process corresponds to the minimal entropic action pathway derived from the Obidi Field equations.
2. Unification: Together with the Obidi Correspondence Principle (OCP), it helps bridge classical information theory, quantum mechanics, and gravity.
3. Consistency: It ensures that ToE remains consistent with classical information theory, treating established probability theories as special, coarse-grained limits of the more general, continuous entropic field. 

If you're interested in the mathematical details, we can explain to you:

• How the Obidi Action (c) connects specifically to information metrics.
• More about the Alemoh-Obidi Correspondence (AOC) mentioned in the documents.
• How ToE differs from Verlinde's Entropic Gravity.

Let us know which of these aligns with your interests.