Fractal Schr\"odinger Equation: Implications for Fractal Sets
Abstract
This paper delves into the world of fractal calculus, investigating its implications for fractal sets. It introduces the Fractal Schr\"odinger Equation and provides insights into its consequences. The study presents a General Solution for the Time-Dependent Schr\"odinger Equation, unveiling its core aspects. Exploring quantum mechanics in the context of fractals, the paper analyzes the Probability Density of the Radial Hydrogen Atom, unveiling its behavior within fractal dimensions. The investigation extends to deciphering the intricate Energy Levels of the Hydrogen Atom, uncovering the interplay of quantum mechanics and fractal geometry. Innovatively, the research applies the Fractal Schr\"odinger Equation to Simple Harmonic Motion, leading to the introduction of the Fractal Probability Density Function for the Harmonic Oscillator. The paper employs a series of illustrative figures that enhance the comprehension of the findings. By intertwining quantum mechanics and fractal mathematics, this research paves the way for deeper insights into their relationship.
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