Statistical Assemblies of Particles with Spin
Abstract
Spin, in quantum theory can assume only half odd integer or integer values. For a given , there exist states , . A statistical assembly of particles (like a beam or target employed in experiments in physics) with the lowest value of spin can be described in terms of probabilities assigned to the two states . A generalization of this concept to higher spins leads only to a particularly simple category of statistical assemblies known as `Oriented systems'. To provide a comprehensive description of all realizable categories of statistical assemblies in experiments, it is advantageous to employ the generators of the Lie group . The probability domain then gets identified to the interior of regular polyhedra in where the centre corresponds to an unpolarized assembly and the vertices represent `pure' states. All the other interior points correspond to `mixed' states. The higher spin system has embedded within itself a set of independent axes, which are determinable empirically. Only when all these axes turn out to be collinear, the simple category of `Oriented systems' is realized, where probabilities are assigned to the states . The simplest case of higher spin provides an illustrative example, where additional features of `aligned' and more general `non oriented' categories are displayed.
Keywords
Cite
@article{arxiv.1909.03931,
title = {Statistical Assemblies of Particles with Spin},
author = {G. Ramachandran},
journal= {arXiv preprint arXiv:1909.03931},
year = {2019}
}