In this thread, I want to draw your attention to the foundations of quantum mechanics, because going back to the origins, you can see new opportunities for cold fusion through the prism of quantum gravity.
I will not write here about the new geometry in the language of formulas, but will limit myself to asking you to represent the coordinates of Minkowski space-time in the form of cylindrical helical lines. Then a manifold is formed from the Minkowski space and the product of a circle on a three-dimensional sphere, which is the basis of the new geometry. And a random walk on this manifold forms the chaotic dynamics of a quantum particle.
If you want to talk in the language of formulas, you can leave a comment on the article Chaotic dynamic on the sphere, but if you are only interested in the influence of this approach on the theoretical foundations of cold fusion, then you can look there only the generalized Schrodinger equation.
PS
Abstract
First, we construct the image of the torus on the two-layer shell of the sphere and note that the isometries of the image of the torus on the sphere generate the unitary group $U(2)$, and then we establish that, as a result of the action of the modular group on the sphere, of all closed torus windings wound around the sphere, singly wound windings are allocated, which are indexed by a set of primes. Next, we form a representation of the sphere winding for the Jacobi theta function and the Riemann zeta function, and then, considering the chaotic dynamics on the sphere, we notice that in the problem of random walk along the broken lines of the winding of the sphere, the concept of a complex probability amplitude arises quite naturally, and the dynamics of the probability amplitude of a wandering particle obeys a differential equation generalizing the Schrödinger equation.
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