Your search keyword '"Robert A Finkelstein"' showing total 3 results

1. On the SLq(2) extension of the standard model and the concept of charge

Author

Robert J. Finkelstein

Subjects

High Energy Physics - Theory, Quark, Coupling constant, Physics, Nuclear and High Energy Physics, 010308 nuclear & particles physics, Computer Science::Information Retrieval, Astrophysics::Instrumentation and Methods for Astrophysics, FOS: Physical sciences, Computer Science::Computation and Language (Computational Linguistics and Natural Language and Speech Processing), Astronomy and Astrophysics, Mathematics::Geometric Topology, 01 natural sciences, Atomic and Molecular Physics, and Optics, Gluon, Knot theory, High Energy Physics - Theory (hep-th), 0103 physical sciences, Computer Science::General Literature, Preon, 010306 general physics, Knot (mathematics), Lepton, Writhe, Mathematical physics

Abstract

Our SLq(2) extension of the standard model is constructed by replacing the elementary field operators, $\Psi (x)$, of the standard model by $\hat{\Psi}^{j}_{mm'}(x) D^{j}_{mm'}$ where $D^{j}_{mm'}$ is an element of the $2j + 1$ dimensional representation of the SLq(2) algebra, which is also the knot algebra. The allowed quantum states $(j,m,m')$ are restricted by the topological conditions \begin{equation*} (j,m,m') = \frac{1}{2}(N,w,r+o) \end{equation*} postulated between the states of the quantum knot $(j,m,m')$ and the corresponding classical knot $(N,w,r+o)$ where the $(N,w,r)$ are (the number of crossings, the writhe, the rotation) of the 2d projection of the corresponding oriented classical knot. Here $o$ is an odd number that is required by the difference in parity between $w$ and $r$. There is also the empirical restriction on the allowed states \begin{equation*} (j,m,m')=3(t,-t_3,-t_0)_L \end{equation*} that holds at the $j=\frac{3}{2}$ level, connecting quantum trefoils $(\frac{3}{2},m,m')$ with leptons and quarks $(\frac{1}{2}, -t_3, -t_0)_L$. The so constructed knotted leptons and quarks turn out to be composed of three $j=\frac{1}{2}$ particles which unexpectedly agree with the preon models of Harrari and Shupe. The $j=0$ particles, being electroweak neutral, are dark and plausibly greatly outnumber the quarks and leptons. The SLq(2) or $(j,m,m')$ measure of charge has a direct physical interpretation since $2j$ is the total number of preonic charges while $2m$ and $2m'$ are the numbers of writhe and rotation sources of preonic charge. The total SLq(2) charge of a particle, measured by writhe and rotation and composed of preons, sums the signs of the counterclockwise turns $(+1)$ and clockwise turns $(-1)$ that any energy-momentum current makes in going once around the knot... Keywords: Quantum group; electroweak; knot models; preon models; dark matter., Comment: 21 pages, 3 figures. arXiv admin note: text overlap with arXiv:1401.1833

Published

2017

2. The SLq(2) extension of the standard model

Author

Robert J. Finkelstein

Subjects

Physics, Nuclear and High Energy Physics, Quantum group, Astronomy and Astrophysics, Elementary particle, Fermion, Mathematics::Geometric Topology, Atomic and Molecular Physics, and Optics, Knot theory, Quantization (physics), Knot (unit), Classical mechanics, Fundamental representation, Preon

Abstract

The idea that the elementary particles might have the symmetry of knots has had a long history. In any modern formulation of this idea, however, the knot must be quantized. The present review is a summary of a small set of papers that began as an attempt to correlate the properties of quantized knots with empirical properties of the elementary particles. As the ideas behind these papers have developed over a number of years, the model has evolved, and this review is intended to present the model in its current form. The original picture of an elementary fermion as a solitonic knot of field, described by the trefoil representation of SUq(2), has expanded into its present form in which a knotted field is complementary to a composite structure composed of three preons that in turn are described by the fundamental representation of SLq(2). Higher representations of SLq(2) are interpreted as describing composite particles composed of three or more preons bound by a knotted field. This preon model unexpectedly agrees in important detail with the Harari–Shupe model. There is an associated Lagrangian dynamics capable in principle of describing the interactions and masses of the particles generated by the model.

Published

2015

3. The preon sector of the SLq(2) model and the binding problem

Author

Robert J. Finkelstein

Subjects

High Energy Physics - Theory, Physics, Quark, Quantum Physics, Nuclear and High Energy Physics, Particle physics, Field (physics), Quantum group, High Energy Physics::Phenomenology, Electroweak interaction, FOS: Physical sciences, Astronomy and Astrophysics, Atomic and Molecular Physics, and Optics, Knot theory, High Energy Physics - Theory (hep-th), High Energy Physics::Experiment, Neutrino, Preon, Quantum Physics (quant-ph), Lepton

Abstract

There are suggestive experimental indications that the leptons, neutrinos, and quarks are composite and that their structure is described by the quantum group SLq(2). Since the hypothetical preons must be very heavy relative to the masses of the leptons, neutrinos, and quarks, there must be a very strong binding field to permit these composite particles to form. Unfortunately there are no experiments direct enough to establish the order of magnitude needed to make the SLq(2) Lagrangian dynamics quantitative. It is possible, however, to parametrize the preon masses and interactions that would be necessary to stabilize the three particle composite representing the leptons, neutrinos, and quarks. In this note we examine possible parametrizations of the masses and the interactions of these hypothetical structures. We also note an alternative view of SLq(2) preons., arXiv admin note: text overlap with arXiv:1301.6440

Published

2014