I have been writing and talking for many years about the nature of Riemannian branch-point surface functions as modified from the standpoint Cantor’s transfinite numbers. In fact, the ability of humanity to overcome the relatively finite resources of any technological modality is a redefinition of what constitutes a resource via a new transfinite manifold through the singularity of creative breakthroughs.
So it comes as a confirmation that the wave function for irrational values of alpha (a variable in Schrödinger’s equation) can be solved by approaching its infinity of possible states via the Cantor set number line method. The connection to both Riemann’s studies of supersonic flight and method of reining in the Zeta function by reflection through trivial zeros in the negative x half of the complex plane is relevant.
That the physical geometry of least action is universal across anomalous states of the inorganic, living and noetic realms. Waves and types of infinity are indissolubly connected.
