Kaluza-Klein Type Model for the Structure of the Neutral Particle-like Solutions

Abstract: The paper examines the geometrical properties of a six-dimensional Kaluza-Klein type model. They may have an impact on the model of the structure of a neutron and its excited states in the realm of particle physics. The statistical reason for the six-dimensionality and the stability of the solution is given. The derivation of the weak limit approximation of the general wave mechanical (quantum mechanical) approach, defined in the context of losing its self-consistency (here gravitational), is presented. The no… Show more

“…In [17] the latitude of the classical spin vector appears as a constant of motion. This type of semiclassical quantization also appears in [23] for the description of the spin of the neutron. The suitable steps for the photon are as follows.…”

“…In the case of the self-consistent model of classical field interactions of the electroweak model that is solved in the presence of nonzero extended fermionic charge density fluctuations, the solution obtained in [48] was a spin zero electrically uncharged droplet, interpreted as the state of mass equal to ∼ 126.5 GeV, which was observed recently in an LHC experiment. In [23,49,50] the dynamical compactification of a six-dimensional model of the space-time to the four-dimensional, locally Minkowskian space-time, which resulted from the self-consistent solution of the coupled Einstein and Klein-Gordon equations, was presented.…”

Frieden wave-function representations via an Einstein-Podolsky-Rosen-Bohm experiment

“…In [17] the latitude of the classical spin vector appears as a constant of motion. This type of semiclassical quantization also appears in [23] for the description of the spin of the neutron. The suitable steps for the photon are as follows.…”

“…In the case of the self-consistent model of classical field interactions of the electroweak model that is solved in the presence of nonzero extended fermionic charge density fluctuations, the solution obtained in [48] was a spin zero electrically uncharged droplet, interpreted as the state of mass equal to ∼ 126.5 GeV, which was observed recently in an LHC experiment. In [23,49,50] the dynamical compactification of a six-dimensional model of the space-time to the four-dimensional, locally Minkowskian space-time, which resulted from the self-consistent solution of the coupled Einstein and Klein-Gordon equations, was presented.…”

Frieden wave-function representations via an Einstein-Podolsky-Rosen-Bohm experiment

“…the lack of tachions in the theory [17]. It must be pointed out that, according to (52), the zeroing of particle mass would be impossible for the Euclidean space-time metric (14).…”

“…Then, every one of the distributions p n (y n |θ n ) is the point of the statistical model S = {p n (y n |θ n )}, which is parameterized by the natural parameter, i.e. by the expectation value θ n ≡ (θ (17). Consequently, the dimension of the sample space B and the dimension of the parametric space V Θ of the vector parameter Θ ≡ (θ and, as the sample Y is N × 4-dimensional random variable, hence the set S N ×4 = {p n (y|Θ)} is the statistical space on which the parameters (θ form the N × 4-dimensional local coordinate system.…”

Information channel capacity in the field theory estimation

“…This boson field is a self-field (or can be treated as one) when it is coupled to a source-"basic" field. In general, the term "basic" field means a wave function that is proper for a fermion (fluctuation), a scalar (fluctuation) or a dilatonic field [16,17] and, although not in this paper, a charged or heavy boson (which in this case plays simultaneously the role of both the basic and ground field). The above mentioned concept of a wave function and the Schrödinger wave equation is dominant in the nonrelativistic physics of atoms, molecules and condensed matter [18].…”

The weak bound state with the non-zero charge density as the LHC 126.5 GeV state