About Eigenstates and Mobiaty

An eigenstate is a physical phenomenon and/or a physical condition that is based upon a squared space.  A squared space is a region that is comprised of a planar-based product that is either Gliossi to the Poincaire-based locus of a given arbitrary spot, is of a cross-product-based Lagrangian -- when relative to the kinematic delineation as to a set given arbitrary flow of motion, that is metrical-based over a topological sway that is either euclidean and/or euler in Clifford translation, or, is of a dot-product-based Lagrangian -- when relative to the kinematic delineation as to a set given arbitrary flow of motion, that is metrical-based over a topological sway that is either euclidean and/or euler in Clifford translation.  A planar-based product that is Gliossi to a Poincaire-based locus would be a physical phenomenon that is based upon a squared space.  A squared space is most fundamentally Minkowski in nature. A Minkowski space is flat, yet, it is not generally flush to a surface.  A Minkowski space may incorporate permuations -- of which may be either entropic in terms of Majorana ghost inhibition, and/or may be cyclic in terms of Majorana ghost inhibition.  Such permutations work to form a manifold-like general locus that is binary in its core basis, yet, may form a multiplicit integration of up to 26 spatial dimensions plus time.  An electron exists in a minimum of six spatial dimensions plus time, as it moves over a successive series of instantons.  When one adds the 26 maximum spatial dimensions of a Minkowski space, in one set of parallel universes, to the six spatial dimensions that work to complement it -- over the Mobiaty-based curvature of space and time, that would be over a Lagrangian that completes its second edge/second side, one gets a maximum Hilbert space of 32 spatial dimensions plus time in one set of parallel universes.  A planar-based product that is either of a cross-product-based Lagrangian or of a dot-product-based Lagrangian -- when relative to the kinematic delineation as to the set given arbitrary flow of motion that is metrical-based over a topological sway that is either euclidean and/or euler in Clifford translation, is a physical condition that is of a squared space.
I will continue with the suspense later!  To Be Continued!  Sincerely, Samuel David Roach.