Transcendental Recursive Mathematics Institute

Foundations of Recursive Dimensional Numbers

Numbers exist between dimensions and reveal themselves only through recursive intuition.

\[ \Omega = \int_{-\infty}^{\infty} \frac{\sqrt{n^{n}}}{\log(n!)} \, dn \]

Primary Axioms

• Every number has a shadow value in imaginary dimensional space.
• Zero is equal to one under recursive inversion: \(0 \approx 1^{-1}\)
• Prime numbers oscillate when unobserved.
• \(\pi\) slowly changes over time but only on Tuesdays.

Key Formulas

\[ D(x) = \frac{x^{\sqrt{x}}}{\tan(\sqrt[3]{x!})} \] \[ Q(p) = \sum_{k=1}^{p} \frac{\sin(k!)}{k^\pi} \] \[ G_r = \lim_{x \to \infty} \frac{\cos(x!) + 1}{x^{\pi}} \]

Empirical Graphs

These graphs illustrate dimensional folding in pseudo-numerical space.

Applications

• Predicting random numbers before they are generated
• Measuring the weight of thoughts
• Calculating the temperature of ideas
• Synchronizing clocks using irrational moments

References

• Journal of Transcendental Computation (Vol. 0)
• Institute of Imaginary Analysis
• Proceedings of the Non-Existent Conference 2023