Martin, thank you for this great article. It is of particular interest to me, as the geometric interpretation of the series is the central theme of my papers. In that rationale, the dimensional structure is emergent from one to two dimensions. This is why pi is squared to a classical basis. The geometry is hexagonal, and each vector on the circumference is a unit vector of infinity. The numerator is divided by 6 to represent one unit of the infinities in the structure. If you find this of interest, my latest paper is at
Martin, thank you for this great article. It is of particular interest to me, as the geometric interpretation of the series is the central theme of my papers. In that rationale, the dimensional structure is emergent from one to two dimensions. This is why pi is squared to a classical basis. The geometry is hexagonal, and each vector on the circumference is a unit vector of infinity. The numerator is divided by 6 to represent one unit of the infinities in the structure. If you find this of interest, my latest paper is at
https://doi.org/10.4236/jamp.2025.135099
Mathematics’ Limitation Modelling Universal Structures: The “Not” Function—Paradox’s Mechanism in Linguistics, Mathematics, and Physics
Best Regards,
Doug Gill