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  Temporal Flow Theory of Quantum Measurement: Physical Interactions 1. Foundation: Temporal Interaction Framework 1.1 Core Measurement Process The measurement process in the Temporal Flow Theory arises from interactions between the system, observer, and environment, all governed by temporal flows. These interactions evolve over time, with the dynamics of measurement and observation being described by a temporal flow equation. Measurement Equation (Normalized) The normalized measurement equation captures the interaction between the observer and system in the temporal flow framework: M ( T i , T j ) = α observer ( T i , T j ) ⋅ α system ( T i , T j ) Z M(T_i, T_j) = \frac{\alpha_{\text{observer}}(T_i, T_j) \cdot \alpha_{\text{system}}(T_i, T_j)}{Z} ​ where Z Z  is the normalization factor given by: Z = ∫ ∫ α observer ( T i , T j ) ⋅ α system ( T i , T j )   d T i d T j Z = \int \int \alpha_{\text{observer}}(T_i, T_j) \cdot \alpha_{\text{system}}(T_i, T_j) \, dT_i dT_j ​ This en...

 Understanding Temporal Interactions in Physics In this post, we’ll explore understanding temporal interactions and their implications for physical properties. My model integrates traditional physics with concepts of temporal flows , quantum fluctuations , and dynamic stability analysis . Core Equations and Notations Today we are looking at several equations to model temporal interactions. These equations incorporate temporal dilation, mass scaling, and quantum fluctuations represent forces and dynamics in both small- and large-scale systems. Interaction Strength (α) with Temporal Dilation : The interaction strength between two temporal points T i T_i  and T j T_j  is influenced by mass differences, temporal dilation effects, and quantum interactions. The general form is: α ( T i , T j ) = k ⋅ g ( T i , T j ) ⋅ β ( m ) ⋅ γ ( Δ t ) ⋅ ∣ T i − T j ∣ + ϵ ⋅ α quantum ⋅ t ( T i , T j ) Where: k k : A constant adjusting interaction strength based on distance. g ( T i , T j ) g(T...

Solving the Quantum Measurement Problem with Temporal Physics The quantum measurement problem remains one of the most debated aspects of quantum mechanics. It arises from the challenge of understanding how and why quantum systems transition from a superposition of probabilistic states to a definite outcome upon measurement. Traditional interpretations, such as the Copenhagen interpretation (wavefunction collapse), Many-Worlds (branching realities), and Bohmian mechanics (deterministic particle trajectories guided by a "pilot wave"), all attempt to explain this process but face limitations in explaining the exact dynamics. In this article, I propose a model of temporal physics, where time is treated as a dynamic, multi-dimensional flow rather than a passive background dimension. By applying the principles of this model, we can approach the measurement problem from a fresh perspective, viewing measurement not as a collapse of the wavefunction, but as the stabilization of tempor...

  MS-CoPilots interpritation of an atom in my model Particles in the Temporal Physics Model Introduction      The Temporal Physics Model introduces an different approach to understanding particle interactions, positioning time as fundimental in the physical universe. Unlike traditional physics, where time is often seen as a passive dimension, this model views time as an active, dynamic flow that shapes matter, forces, and fundamental particles. By conceptualizing temporal flows as discrete packets carrying influence, we can gain new insights into how particles interact, unify the fundamental forces, and even explain the formation of atomic structures.  Definition of Temporal Flows      In the Temporal Physics framework, temporal flows represent the dynamic flows of time across different scales, impacting space, matter, and forces. Here, temporal flows are segmented into discrete packets, each carrying temporal energy or influence. These flows in...

  Cosmological structure as seen by MS-CoPilot Temporal Physics and the Cosmological Constant Introduction In my exploration of Temporal Physics , I have reexamined how we conceptualize the cosmological constant and its effects on the universe's expansion. Traditionally viewed as a fixed constant, the cosmological constant in this framework is time-dependent and subject to the fluctuations of temporal flows , which I describe as the dynamic flows of time across different scales. This work combines previous analyses of the CMBR (Cosmic Microwave Background Radiation) with my new formulation of the cosmological constant and its effective form within the Temporal Physics model. The Time-Dependent Cosmological Constant The cosmological constant is typically treated as a fixed parameter in current cosmological models. However, in the Temporal Physics framework , I propose that the cosmological constant is inherently time-dependent , fluctuating as a result of the dynamic changes in...