The isolated electron: De Broglie's "hidden" thermodynamics, SU(2) Quantum Yang-Mills theory, and a strongly perturbed BPS monopole

Abstract

Based on a recent numerical simulation of the temporal evolution of a spherically perturbed BPS monopole, SU(2) Yang-Mills thermodynamics, Louis de Broglie's deliberations on the disparate Lorentz transformations of the frequency of an internal "clock" on one hand and the associated quantum energy on the other hand, and postulating that the electron is represented by a figure-eight shaped, self-intersecting center vortex loop in SU(2) Quantum Yang-Mills theory we estimate the spatial radius R0 of this self-intersection region in terms of the electron's Compton wave length λC. This region, which is immersed into the confining phase, constitutes a blob of deconfining phase of temperature T0 mildly above the critical temperature Tc carrying a frequently perturbed BPS monopole (with a magnetic-electric dual interpretation of its charge w.r.t. U(1)⊂SU(2)). We also establish a quantitative relation between rest mass m0 of the electron and SU(2) Yang-Mills scale , which in turn is defined via Tc. Surprisingly, R0 turns out to be comparable to the Bohr radius while the core size of the monopole matches λC, and the correction to the mass of the electron due to Coulomb energy is about 2\,\%.