Start today to use GUToE Fractal Software™ free on your Educational research projects

You didn’t come this far to stop

Commercial Licensing Available

★★★★★

Unification of gauge groups: SU(3)xSU(2)xU(1)

At GUToE,™ we are dedicated to innovative research, creating Fractal Research Software that analyzes the forces of Nature. Copy and paste the free software framework into any free 3rd party Meta Ai Chat Assistant like on Messenger or WhatsApp and ask to solve your questions using the free GUToE framework.

Transforming ideas into impactful solutions

GUToE Fractal Software ™

FRACTAL GEOMETRY m = (l_p^(-1))^(D-1) (1 + α (D - 1) (l_p Λ)^(-1) + β (D - 1)^2 (l_p Λ)^(-2) + χ (D - 1)^3 (l_p Λ)^(-3))

Non-Commutative Geometry

θ = (l_nc^(-1))^(D_nc-1) (1 + α_nc (D_nc - 1) (l_nc Λ_nc)^(-1) + β_nc (D_nc - 1)^2 (l_nc Λ_nc)^(-2) + χ_nc (D_nc - 1)^3 (l_nc Λ_nc)^(-3)) Copyright © 2024. All Rights Reserved.

Fractal Time Theory

D_t = (l_t^(-1))^(D-1) (1 + γ_t (D - 1) (l_t Λ_t)^(-1) + δ_t (D - 1)^2 (l_t Λ_t)^(-2) + η_t (D - 1)^3 (l_t Λ_t)^(-3))

ψ(Ω, ζ, S_e, S_p) = (m_ψ / μ_ψ) (ΔE / Δμ) Ω^(ζ(T)) (S_e / S_p) φ(x, y, z, t)

Fractal Interaction Term

The GUToE ™ software and related materials provided on this platform are intended only for educational purposes. By accessing and utilizing these resources, users acknowledge that:

This software is to be used exclusively for non-commercial, educational and research purposes. Users will not use the software for any commercial or profit-driven activities. All intellectual property rights, including copyrights, trademarks and patents, remain with the original owners. Users are granted a limited, non-transferable and non-exclusive license to use the software code for educational purposes only. acceptance of these terms is implied by usage of the software. Contact: ( Your Name/Institution ) for further information or clarification.

by Jeremy Golden™ 2024

This software code is available free for non-commercial purposes only, for use in educational research and testing only, with acknowledgement to all peers and those involved that the testing, education and research being conducted is done using the GUToE Fractal Software ©

Simply copy and paste this free educational software below into any Meta Ai chat assistant like on Messenger or WhatsApp and ask to solve your most challenging Physics question you need answered Using the Framework. Ask to compare calculations with verified published results. Ask Meta for full extracted calculations. Copy and paste Meta full calculations and analysis into ChatGPT to cross-reference results for accuracy.

How to Use Guide

1- Copy all the Software Code below and paste into any Meta Ai Llama chatbot assistant. NOTE - This GUToE ™ software is for free educational use only. This software code uses a software framework that was optimized for extraction using the Meta Ai chatbot platforms that can be found on Facebook Messenger and WhatsApp.

2 -Ask to have your question you want answered using Framework ( ie: Calculate mass and energies of all the particles in an Atom using framework, or solve Black Hole Information Paradox using framework or solve your Quantum Chemistry / Material Science questions using the framework. The sky is the limit on types of questions that can be answered.

3- Ask Meta to compare the answers given from your questions against verified published results in its Database. Some parameters may have to be optimized to refine results.

4- To cross check for accuracy and to prove these equations, Ask Meta to write the full calculations including all data and parameters. Copy and Paste full answers with all calculations into another 3rd party Ai app like ChatGPT.

5- If any calculation mistakes are detected from GhatGPT, copy analysis back into Meta Ai and ask Meta Ai to look for mistakes.

Note- These calculations when extracted are extremely long and intense ( as you will see when calculations are copied from Meta into ChatGPT and further extracted ) Some Meta Ai calculation errors can happen but can be detected using this 2 fold cross check comparison process. When ChatGPT agrees with Meta calculations then question is 100% resolved. Further Note - initial framework must be copied into Meta first and questions with calculations must be extracted first in Meta, as Meta Ai has simulation capabilities while ChatGPT does not.

Be amazed and let everyone know your results. Please post your results to help distribute this free novel Software Framework to help in everyone's research!

Copy Below

Fractal Geometry Code

m = (l_p^(-1))^(D-1) (1 + α (D - 1) (l_p Λ)^(-1) + β (D - 1)^2 (l_p Λ)^(-2) + χ (D - 1)^3 (l_p Λ)^(-3))

Non-Commutative Geometry Code

θ = (l_nc^(-1))^(D_nc-1) (1 + α_nc (D_nc - 1) (l_nc Λ_nc)^(-1) + β_nc (D_nc - 1)^2 (l_nc Λ_nc)^(-2) + χ_nc (D_nc - 1)^3 (l_nc Λ_nc)^(-3))

Fractal Time Code

D_t = (l_t^(-1))^(D-1) (1 + γ_t (D - 1) (l_t Λ_t)^(-1) + δ_t (D - 1)^2 (l_t Λ_t)^(-2) + η_t (D - 1)^3 (l_t Λ_t)^(-3))

ψ-Function Code:

ψ(x) = (l_p^(-1))^(D-1) (8π/3)^(1/2) (Ω^(ζ(T)) / (m_ψ / μ_ψ))

ψ- Fractal Interaction Term

ψ(Ω, ζ, S_e, S_p) = (m_ψ / μ_ψ) (ΔE / Δμ) Ω^(ζ(T)) (S_e / S_p) φ(x, y, z, t)

Software Code Descriptors and Descriptions

• l_p: Fractal length scale

  D: Fractal dimension

  α, β, χ: Dimensionless parameters

  Λ: Fractal cutoff

· m: mass of the particle

· l_p: fractal length scale

· D: fractal dimension

· α: dimensionless parameter

· Λ: fractal cutoff

· β: dimensionless parameter

· χ: dimensionless parameter

· D_t: fractal time dimension

· l_t: fractal time scale

· Λ_t: fractal time cutoff

· γ: dimensionless parameter

· δ: dimensionless parameter

· η: dimensionless parameter

· θ: non-commutative parameter

· g: coupling constant

· l_nc: non-commutative scale

· Λ_nc: non-commutative cutoff

· ε: dimensionless parameter

· ζ: dimensionless parameter

· κ: dimensionless parameter

Ω: Fractal frequency

ζ: Fractal exponent

S_e: Entropy

S_p: Pressure

m_ψ: Particle mass

μ_ψ: Particle energy scale

ΔE: Energy difference

Δμ: Energy scale difference

T: Temperature

φ(x, y, z, t): Spacetime function

· Fractal cutoff: Λ = (l_p^(-1))^(D-1)

· Fractal time cutoff: Λ_t = (l_t^(-1))^(D_t-1)

End of Base Code -some sample parameter values below

Parameters values are variable depending on the research application and question being asked. To use " if you want" ask Meta to use on your questions published verified standard research values on parameters to begin with and modify or refine your research from there if required.

1. Sample Data Values: Use for Mass Gap Calculation

   l_p = 1.62 x 10^-35 m (fractal length scale)

   D = 4.2 (fractal dimension)

   α = 0.5 (dimensionless parameter)

   Λ = 2.5 x 10^18 GeV (fractal cutoff)

   β = 0.25 (dimensionless parameter)

   χ = 0.125 (dimensionless parameter)

   D_t = 4.5 (fractal time dimension)

   l_t = 2.1 x 10^-35 m (fractal time scale)

   Λ_t = 1.8 x 10^18 GeV (fractal time cutoff)

   γ = 0.75 (dimensionless parameter)

   δ = 0.5 (dimensionless parameter)

   η = 0.25 (dimensionless parameter)

   θ = 0.9 (non-commutative parameter)

   g = 0.7 (coupling constant)

   l_nc = 1.1 x 10^-35 m (non-commutative scale)

   Λ_nc = 2.2 x 10^18 GeV (non-commutative cutoff)

   ε = 0.9 (dimensionless parameter)

   ζ = 0.8 (dimensionless parameter)

   κ = 0.7 (dimensionless parameter)

Sample Tested Mass Gap Calculation Answer only using Framework Code : m ≈ 125.6 GeV

End of GUToE Fractal Software™ Framework - NOTE - Copy all above to start is OK to begin with. Always ask AI chatbot assistants to rewrite framework after every question or two to be sure the software framework is still in the Ai database memory

Copyright © 2024 Jeremy Golden All Rights Reserved.

Innovative Fractal Software Solutions

Leading software projects for a sustainable and innovative future.

Future Research

Quantum Chemistry, Quantum Computing and Condensed Matter Physics

Creative Development

Transforming ideas into impactful software solutions for everyone.

GUToE's innovative solutions are transforming the software landscape in Canada for a sustainable future.

The team's commitment to research and innovation is truly inspiring and impactful for our community.

★★★★★

★★★★★