Editing Openai/67eceef4-f79c-8009-910b-504bec9650ec (section)

=== Assistant: If we introduce a fractal perspective, the idea of moving Planck values to infinity becomes an intriguing possibility. ===
If we introduce a fractal perspective, the idea of moving Planck values to infinity becomes an intriguing possibility. Here’s how it could be approached:

===== 1. The Planck Scale as a Limit in Standard Physics =====

In conventional physics, Planck length, time, and energy are considered fundamental limits:
* The Planck length (~1.6×10−351.6 \times 10^{-35}1.6×10−35 m) is often viewed as the smallest meaningful length.
* The Planck time (~5.4×10−445.4 \times 10^{-44}5.4×10−44 s) is the shortest time interval that has physical meaning.
* The Planck energy (~1.2×10191.2 \times 10^{19}1.2×1019 GeV) represents an upper bound on energy scales in known physics.

These limits emerge from combining quantum mechanics, relativity, and gravity—but they assume a continuous space-time structure.

===== 2. Fractal Structures and Scale Relativity =====

If fractal structures exist at all scales, then space-time might not be smooth but self-similar at different levels of magnification. This idea challenges the notion of a "minimum" length or time.
* A true fractal structure suggests that even below the Planck scale, more levels of structure could exist.
* This could mean that the Planck length is not an absolute lower bound—just the smallest scale we can currently measure.

===== 3. Extending Planck Values to Infinity =====

If space-time is fractal, two possibilities emerge:
# Fractal Scaling Below the Planck Scale (Infinite Smallness) - Instead of Planck length being the smallest unit, nested fractal structures could exist indefinitely. - Each "zoom" would reveal finer levels of detail, much like zooming into a Mandelbrot set. - This suggests that "shorter" time intervals and "smaller" distances exist beyond what standard physics predicts.
# Fractal Scaling Above the Planck Energy (Infinite Energy Levels) - If energy levels also follow a fractal pattern, then higher-energy interactions (beyond Planck energy) might be possible. - The universe could exhibit self-similar energy distributions at both small and large scales.

===== 4. Connection to the Electric Universe =====
* The Electric Universe model suggests that plasma behaviors exhibit fractal self-similarity from galactic to atomic scales.
* If space-time itself follows electric or plasma-like properties, fractal scaling laws could explain structures beyond the Planck limit.

===== Conclusion =====

In a fractal-based universe, Planck values may not be absolute but rather scale-dependent reference points. If this holds, then infinity exists both at the smallest scales and the largest ones, meaning Planck limits could shift depending on observational depth.

Would you like to explore how this idea might connect to observable cosmic structures or quantum experiments?